Discussion:
A strange belief
(too old to reply)
WM
2019-02-27 18:44:04 UTC
Permalink
It is generally accepted that the union of the set of FISONs is

{1} U {1, 2} U {1, 2, 3} U ... = ℕ
or briefly
F_1 U F_2 U F_3 U ... = ℕ.

The first n FISONs can be omitted

F_n U F_(n+1) U F_(n+2) U ... = ℕ .

Since this is true for all n, all F_n can be omitted and we find that no FISONs are necessary but

U{ } = ℕ.

This result makes the mathematical reality of the transfinite set ℕ quite doubtful. Therefore it is not acceptable for adherents of transfinite set theory.

But the following accepted definition of being required

F_n is required <==> U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= ℕ

shows that, according to this definition, the set of required FISONs is empty too.

This is a beautiful result because it forces adherents of transfinite set theory to believe that re-inserting the FISONs F_1, F_2, ..., F_(n-1) into the union U{F(n+1), F_(n+2), ...} is of any significance, such that for some n:

U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= U{F(n+1), F_(n+2), ...}

We do not want to spoil their belief. But students who are not yet closely connected with set theory will perhaps give it some thought whether to get in closer touch with this persuasion.

Regards, WM
Jew Lover
2019-02-27 20:21:28 UTC
Permalink
Post by WM
It is generally accepted that the union of the set of FISONs is
{1} U {1, 2} U {1, 2, 3} U ... = ℕ
or briefly
F_1 U F_2 U F_3 U ... = ℕ.
The first n FISONs can be omitted
F_n U F_(n+1) U F_(n+2) U ... = ℕ .
Since this is true for all n, all F_n can be omitted and we find that no FISONs are necessary but
U{ } = ℕ.
This result makes the mathematical reality of the transfinite set ℕ quite doubtful. Therefore it is not acceptable for adherents of transfinite set theory.
But the following accepted definition of being required
F_n is required <==> U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= ℕ
shows that, according to this definition, the set of required FISONs is empty too.
U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= U{F(n+1), F_(n+2), ...}
We do not want to spoil their belief. But students who are not yet closely connected with set theory will perhaps give it some thought whether to get in closer touch with this persuasion.
Regards, WM
In other words, there is no infinite set. Period.
WM
2019-02-27 21:31:50 UTC
Permalink
Post by Jew Lover
In other words, there is no infinite set. Period.
Otherwise we would have to accept that

F_1 =/= ℕ
F_1 U F_2 =/= ℕ
F_1 U F_2 U F_3 =/= ℕ
...
but
F_1 U F_2 U F_3 U ... = ℕ when constructing ℕ bei the union of all FISONs.

On the other hand

F_1 =/= ℕ
F_1 U F_2 =/= ℕ
F_1 U F_2 U F_3 =/= ℕ
...
and
F_1 U F_2 U F_3 U ... =/= ℕ when destructing ℕ by removing all FISONs.

Regards, WM
Zeit Geist
2019-02-27 21:44:26 UTC
Permalink
Post by WM
Post by Jew Lover
In other words, there is no infinite set. Period.
Otherwise we would have to accept that
F_1 =/= ℕ
F_1 U F_2 =/= ℕ
F_1 U F_2 U F_3 =/= ℕ
...
but
F_1 U F_2 U F_3 U ... = ℕ when constructing ℕ bei the union of all FISONs.
On the other hand
F_1 =/= ℕ
F_1 U F_2 =/= ℕ
F_1 U F_2 U F_3 =/= ℕ
...
and
F_1 U F_2 U F_3 U ... =/= ℕ when destructing ℕ by removing all FISONs.
That does not follow. You are so sad.
Post by WM
Regards, WM
ZG
Jew Lover
2019-02-27 23:11:43 UTC
Permalink
Post by Zeit Geist
Post by WM
Post by Jew Lover
In other words, there is no infinite set. Period.
Otherwise we would have to accept that
F_1 =/= ℕ
F_1 U F_2 =/= ℕ
F_1 U F_2 U F_3 =/= ℕ
...
but
F_1 U F_2 U F_3 U ... = ℕ when constructing ℕ bei the union of all FISONs.
On the other hand
F_1 =/= ℕ
F_1 U F_2 =/= ℕ
F_1 U F_2 U F_3 =/= ℕ
...
and
F_1 U F_2 U F_3 U ... =/= ℕ when destructing ℕ by removing all FISONs.
That does not follow.
It follows precisely. This is the kind of logic a two year old will understand, but not an orangutan of set theory.
Post by Zeit Geist
You are so sad.
If WM is sad, the you are truly tragic.
Post by Zeit Geist
Post by WM
Regards, WM
ZG
Zelos Malum
2019-02-28 07:05:06 UTC
Permalink
Post by Jew Lover
In other words, there is no infinite set. Period.
A fallacious arguement does nto invalidate infinite sets.
Post by Jew Lover
It follows precisely. This is the kind of logic a two year old will understand, but not an orangutan of set theory.
It does not, there is no theorem in FOL that Ax(P(x)) => P(|N)

It does not exist so it is fallacious to use it.
Post by Jew Lover
Only a deluded fool would try to refute any of this. There are many of those in the Church of Academia.
Why? it is extremely trivial to refute it.
Jew Lover
2019-02-28 12:14:44 UTC
Permalink
Post by Zelos Malum
Post by Jew Lover
In other words, there is no infinite set. Period.
A fallacious arguement does nto invalidate infinite sets.
A fallacious belief does not invalidate logic. Chuckle. Unfortunately, you never even get to the argument part because you have nothing but beliefs (ZFC crap axioms) and meaningless decrees.

YOU will not dictate what is correct knowledge. Not now and not in a thousand years.
j4n bur53
2019-02-28 12:24:27 UTC
Permalink
You mean invalidate, like in invalid 3=<4. Ha Ha?

Do you have any clue what you are saying?
A fallacy is an invalid logical inference.
As long as you cannot show why a fallacy should

nevertheless hold, you didn't show anything
mathematically. You only conjecture something.
Unfortunately not all fallacies can be repaired,

some are broken beyond repair. Anyway there
is a simple medicin for morons like WM and JG,
why don't you play around with a truth table generator?

http://web.stanford.edu/class/cs103/tools/truth-table-tool/

For example this fallacy can be repaired:

p q ((p → q) → (¬p → ¬q))
F F T
F T F
T F T
T T T

If manage to show that for your p,q the situation
p=F and q=T cannot happen on some other grounds.

But repairing this one will be like impossible:

p q ((p ∧ q) ∧ ((p → ¬q) ∧ (¬q → p)))
F F F
F T F
T F F
T T F
Post by Jew Lover
Post by Zelos Malum
Post by Jew Lover
In other words, there is no infinite set. Period.
A fallacious arguement does nto invalidate infinite sets.
A fallacious belief does not invalidate logic. Chuckle. Unfortunately, you never even get to the argument part because you have nothing but beliefs (ZFC crap axioms) and meaningless decrees.
YOU will not dictate what is correct knowledge. Not now and not in a thousand years.
j4n bur53
2019-02-28 12:27:51 UTC
Permalink
Post by j4n bur53
p q ((p ∧ q) ∧ ((p → ¬q) ∧ (¬q → p)))
F F F
F T F
T F F
T T F
In the empty set of possible worlds.
Oh empty set doesn't exist in WM Muckamatik.

How convenient...
Post by j4n bur53
You mean invalidate, like in invalid 3=<4. Ha Ha?
Do you have any clue what you are saying?
A fallacy is an invalid logical inference.
As long as you cannot show why a fallacy should
nevertheless hold, you didn't show anything
mathematically. You only conjecture something.
Unfortunately not all fallacies can be repaired,
some are broken beyond repair. Anyway there
is a simple medicin for morons like WM and JG,
why don't you play around with a truth table generator?
http://web.stanford.edu/class/cs103/tools/truth-table-tool/
p q ((p → q) → (¬p → ¬q))
F F T
F T F
T F T
T T T
If manage to show that for your p,q the situation
p=F and q=T cannot happen on some other grounds.
p q ((p ∧ q) ∧ ((p → ¬q) ∧ (¬q → p)))
F F F
F T F
T F F
T T F
Post by Jew Lover
Post by Zelos Malum
Post by Jew Lover
In other words, there is no infinite set. Period.
A fallacious arguement does nto invalidate infinite sets.
A fallacious belief does not invalidate logic. Chuckle. Unfortunately, you never even get to the argument part because you have nothing but beliefs (ZFC crap axioms) and meaningless decrees.
YOU will not dictate what is correct knowledge. Not now and not in a thousand years.
j4n bur53
2019-02-28 12:37:26 UTC
Permalink
Everything where the outcome of the truth
table is not always T, is a fallacy.

Otherwise when the outcome of the truth
table is always T, its a tautology,

and you are allowed to use the schema.
Post by j4n bur53
Post by j4n bur53
p q ((p ∧ q) ∧ ((p → ¬q) ∧ (¬q → p)))
F F F
F T F
T F F
T T F
In the empty set of possible worlds.
Oh empty set doesn't exist in WM Muckamatik.
How convenient...
Post by j4n bur53
You mean invalidate, like in invalid 3=<4. Ha Ha?
Do you have any clue what you are saying?
A fallacy is an invalid logical inference.
As long as you cannot show why a fallacy should
nevertheless hold, you didn't show anything
mathematically. You only conjecture something.
Unfortunately not all fallacies can be repaired,
some are broken beyond repair. Anyway there
is a simple medicin for morons like WM and JG,
why don't you play around with a truth table generator?
http://web.stanford.edu/class/cs103/tools/truth-table-tool/
p q ((p → q) → (¬p → ¬q))
F F T
F T F
T F T
T T T
If manage to show that for your p,q the situation
p=F and q=T cannot happen on some other grounds.
p q ((p ∧ q) ∧ ((p → ¬q) ∧ (¬q → p)))
F F F
F T F
T F F
T T F
Post by Jew Lover
Post by Zelos Malum
Post by Jew Lover
In other words, there is no infinite set. Period.
A fallacious arguement does nto invalidate infinite sets.
A fallacious belief does not invalidate logic. Chuckle. Unfortunately, you never even get to the argument part because you have nothing but beliefs (ZFC crap axioms) and meaningless decrees.
YOU will not dictate what is correct knowledge. Not now and not in a thousand years.
Jew Lover
2019-02-28 13:16:24 UTC
Permalink
You mean invalidate, like in invalid 3=<4...
Shut up moron. 3=<4 is used by intellectually challenged fools like you.
Zelos Malum
2019-03-01 06:30:51 UTC
Permalink
Post by Jew Lover
A fallacious belief does not invalidate logic
Of course not, that is why your beliefs do not invalidate logic.
Post by Jew Lover
Unfortunately, you never even get to the argument part because you have nothing but beliefs
Got nothing of the sort.
Post by Jew Lover
(ZFC crap axioms) and meaningless decrees.
In deductive logic one must always begin with axioms, from nothing you can only conclude nothing.
Post by Jew Lover
YOU will not dictate what is correct knowledge. Not now and not in a thousand years.
Neither will you.
Post by Jew Lover
Shut up moron. 3=<4 is used by intellectually challenged fools like you.
3 <= 4 is perfectly valid, there is nothign in the definitions that says it is wrong.
WM
2019-02-28 13:45:30 UTC
Permalink
Post by Zelos Malum
It does not, there is no theorem in FOL that Ax(P(x)) => P(|N)
In fact it is rather nonsensical. But set theory proves it. If you remove all elements from |N then you have removed |N.
Regards, WM
Jew Lover
2019-02-27 23:08:46 UTC
Permalink
Post by WM
Post by Jew Lover
In other words, there is no infinite set. Period.
Otherwise we would have to accept that
F_1 =/= ℕ
F_1 U F_2 =/= ℕ
F_1 U F_2 U F_3 =/= ℕ
...
but
F_1 U F_2 U F_3 U ... = ℕ when constructing ℕ bei the union of all FISONs.
On the other hand
F_1 =/= ℕ
F_1 U F_2 =/= ℕ
F_1 U F_2 U F_3 =/= ℕ
...
and
F_1 U F_2 U F_3 U ... =/= ℕ when destructing ℕ by removing all FISONs.
Only a deluded fool would try to refute any of this. There are many of those in the Church of Academia.
Post by WM
Regards, WM
j4n bur53
2019-02-27 21:37:39 UTC
Permalink
Are you again using:

forall n e N P(n) => P(N) ?

There is no such inference rule on FOL=+ZFC.

You are crazy as usual. Look see, take as predication
the predication of being non-empty, using von Neuman
ordinals, i.e. n={0,..,n-1}:

Q(n) <=> N \ n <> {}

Of course we have:

forall n e N Q(n)

But we don't have, i.e. it is:

~Q(N)

Its that simple. Don't apply fallacies if you
don't want to look idiotic.
Post by WM
It is generally accepted that the union of the set of FISONs is
{1} U {1, 2} U {1, 2, 3} U ... = ℕ
or briefly
F_1 U F_2 U F_3 U ... = ℕ.
The first n FISONs can be omitted
F_n U F_(n+1) U F_(n+2) U ... = ℕ .
Since this is true for all n, all F_n can be omitted and we find that no FISONs are necessary but
U{ } = ℕ.
This result makes the mathematical reality of the transfinite set ℕ quite doubtful. Therefore it is not acceptable for adherents of transfinite set theory.
But the following accepted definition of being required
F_n is required <==> U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= ℕ
shows that, according to this definition, the set of required FISONs is empty too.
U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= U{F(n+1), F_(n+2), ...}
We do not want to spoil their belief. But students who are not yet closely connected with set theory will perhaps give it some thought whether to get in closer touch with this persuasion.
Regards, WM
j4n bur53
2019-02-27 21:43:32 UTC
Permalink
Or to sum up:

"set theory doesn't claim that if something
holds for all elements below omega, that
it automatically also holds for omega"

Alan Smaill already told you that your subject
to some circular reasoning. i.e. you don't
read Cantor correctly.
https://groups.google.com/d/msg/sci.math/X6_CKMTq00Y/QtIFmLCSBgAJ

In particular you are jumping to conclusions
what the logical content of an induction axiom
means, especially transfinite induction.
Post by j4n bur53
forall n e N P(n) => P(N) ?
There is no such inference rule on FOL=+ZFC.
You are crazy as usual. Look see, take as predication
the predication of being non-empty, using von Neuman
Q(n) <=> N \ n <> {}
forall n e N Q(n)
~Q(N)
Its that simple. Don't apply fallacies if you
don't want to look idiotic.
Post by WM
It is generally accepted that the union of the set of FISONs is
{1} U {1, 2} U {1, 2, 3} U ... = ℕ
or briefly
F_1 U F_2 U F_3 U ... = ℕ.
The first n FISONs can be omitted
F_n U F_(n+1) U F_(n+2) U ... = ℕ .
Since this is true for all n, all F_n can be omitted and we find that no FISONs are necessary but
U{ } = ℕ.
This result makes the mathematical reality of the transfinite set ℕ quite doubtful. Therefore it is not acceptable for adherents of transfinite set theory.
But the following accepted definition of being required
F_n is required <==> U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= ℕ
shows that, according to this definition, the set of required FISONs is empty too.
U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= U{F(n+1), F_(n+2), ...}
We do not want to spoil their belief. But students who are not yet closely connected with set theory will perhaps give it some thought whether to get in closer touch with this persuasion.
Regards, WM
WM
2019-02-28 13:41:21 UTC
Permalink
Post by j4n bur53
forall n e N P(n) => P(N) ?
There is no such inference rule on FOL=+ZFC.
Nevertheless set theory proves it. If you remove all elements from |N then you have removed |N. Or does some empty shell remain?
Regards, WM
j4n bur53
2019-02-28 13:42:38 UTC
Permalink
An example is not a prove. For a prove you
would need to have P arbitrary.

Where did you learn logic? In some dump?
Post by WM
Post by j4n bur53
forall n e N P(n) => P(N) ?
There is no such inference rule on FOL=+ZFC.
Nevertheless set theory proves it. If you remove all elements from |N then you have removed |N. Or does some empty shell remain?
Regards, WM
Alan Smaill
2019-02-28 15:18:37 UTC
Permalink
Post by WM
Post by j4n bur53
forall n e N P(n) => P(N) ?
There is no such inference rule on FOL=+ZFC.
Nevertheless set theory proves it.
Then show us a proof in ZF(C).
That would settle the matter.

You may use any result from standard texts of set theory.
Post by WM
Regards, WM
--
Alan Smaill
WM
2019-02-28 18:12:27 UTC
Permalink
Post by Alan Smaill
Post by WM
Post by j4n bur53
forall n e N P(n) => P(N) ?
There is no such inference rule on FOL=+ZFC.
Nevertheless set theory proves it.
Then show us a proof in ZF(C).
That would settle the matter.
You may use any result from standard texts of set theory.
This one is enough: If you biject all elements of Q with elements of |N, then you biject the sets Q and |N.

Do you know that result?

Regards, WM
Alan Smaill
2019-03-01 11:15:06 UTC
Permalink
Post by WM
Post by Alan Smaill
Post by WM
Post by j4n bur53
forall n e N P(n) => P(N) ?
There is no such inference rule on FOL=+ZFC.
Nevertheless set theory proves it.
Then show us a proof in ZF(C).
That would settle the matter.
You may use any result from standard texts of set theory.
This one is enough: If you biject all elements of Q with elements of
|N, then you biject the sets Q and |N.
Do you know that result?
Indeed, by definition of biject.
No need for your bogus inference rule in this case.

But strangely you failed to address the question asked.

You claim that for an arbitrary (let's say definable in ZF(C)) predicate
P, the following is provable in set theory:

all n: |N P(n) => P(|N)

You are being asked for a proof in ZF(C) that this *always* holds.

That is after all your claim, isn't it?
Post by WM
Regards, WM
--
Alan Smaill
WM
2019-03-01 11:42:01 UTC
Permalink
Post by Alan Smaill
Post by WM
Post by Alan Smaill
Post by WM
Post by j4n bur53
forall n e N P(n) => P(N) ?
There is no such inference rule on FOL=+ZFC.
Nevertheless set theory proves it.
Then show us a proof in ZF(C).
That would settle the matter.
You may use any result from standard texts of set theory.
This one is enough: If you biject all elements of Q with elements of
|N, then you biject the sets Q and |N.
Do you know that result?
Indeed, by definition of biject.
By conclusion from every FISON to the whole set.
Post by Alan Smaill
No need for your bogus inference rule in this case.
It has been used to obtain that definition.

if there is never an obstacle or halt in this process of assignment, then both infinite sets are in bijection. ("und es erfährt daher der aus unsrer Regel resultierende Zuordnungsprozeß keinen Stillstand." [Cantor, p. 239])

All well-ordered sets can be compared. They have the same number if they, by preserving their order, can be uniquely mapped or counted onto each other. ("Dabei nenne ich zwei wohlgeordnete Mengen von demselben Typus und schreibe ihnen gleiche Anzahl zu, wenn sie sich unter Wahrung der festgesetzten Rangordnung ihrer Elemente gegenseitig eindeutig aufeinander abbilden, oder wie man sich gewöhnlich ausdrückt, aufeinander abzählen lassen." [G. Cantor, letter to W. Wundt (5 Oct 1883)])
Post by Alan Smaill
You claim that for an arbitrary (let's say definable in ZF(C)) predicate
all n: |N P(n) => P(|N)
You are being asked for a proof in ZF(C) that this *always* holds.
It is the basis of set theory. See above. But since set theory is inconsistent, it does not hold in general.

For instance when removing FISONs from the union of all FISONs (before the union has been executed), then it does not hold. But fortunately we find then that

∃n ∈ ℕ: U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} =/= U{A(n+1), A_(n+2), ...}.

That shows that in fact it does never hold.
Regards, WM
j4n bur53
2019-03-01 12:32:46 UTC
Permalink
In an inconsistent theory, it would hold always you moron.

https://en.wikipedia.org/wiki/Principle_of_explosion
Post by WM
Post by Alan Smaill
You claim that for an arbitrary (let's say definable in ZF(C)) predicate
all n: |N P(n) => P(|N)
You are being asked for a proof in ZF(C) that this *always* holds.
It is the basis of set theory. See above. But since set theory is inconsistent, it does not hold in general.
j4n bur53
2019-03-01 12:39:46 UTC
Permalink
The principle of explosion is even valid in
intuitionistic logic, not only in classical

logic. This here is valid in
intuitionistic logic:

A & ~A -> B

Whats the motto of you cranks? Not a single day
without some new nonsense?
Post by j4n bur53
In an inconsistent theory, it would hold always you moron.
https://en.wikipedia.org/wiki/Principle_of_explosion
Post by WM
Post by Alan Smaill
You claim that for an arbitrary (let's say definable in ZF(C)) predicate
all n: |N P(n) => P(|N)
You are being asked for a proof in ZF(C) that this *always* holds.
It is the basis of set theory. See above. But since set theory is inconsistent, it does not hold in general.
Me
2019-02-28 23:06:41 UTC
Permalink
Post by WM
If you remove all elements from |N
Actually, you can't (literally) REMOVE elements FROM a set.

But we can consider the set difference between, say, IN and IN.
Post by WM
then <bla>. Or does some empty shell remain?
Exactly, it's called the empty set:

IN \ IN = {} .

See: http://mathworld.wolfram.com/SetDifference.html
and: https://proofwiki.org/wiki/Definition:Set_Difference
Jew Lover
2019-03-01 00:38:13 UTC
Permalink
Post by Me
Post by WM
If you remove all elements from |N
Actually, you can't (literally) REMOVE elements FROM a set.
Chuckle. What a moron. You do it all the time in your bogus calculus!

Watch how you remove the point (c, f(c)) from the function f and hence from the domain and range:

f(x) * (x-c)/(x-c)

Obviously, if you can generate all the elements of a set, then you can remove all the elements too. Doh!


Thus, to remove all the elements of f on the interval [a,b], you simply
multiply f(x) by (x - d)/(x - d) where d = a + {[b-a]/n} as n increases indefinitely. Since you believe in infinity, you should have no problem completing this task in your syphilitic brain. Chuckle.

To remove all, you simply take the interval (-oo, oo) and you are done. LMAO.
Jew Lover
2019-03-01 00:40:39 UTC
Permalink
Post by Me
Post by WM
If you remove all elements from |N
Actually, you can't (literally) REMOVE elements FROM a set.
But we can consider the set difference between, say, IN and IN.
Post by WM
then <bla>. Or does some empty shell remain?
IN \ IN = {} .
Er, no idiot. That's not what the argument is saying. It's you who knows shit about set theory or anything else. Yeah, follow your advice and shut up.
Zelos Malum
2019-03-01 06:35:38 UTC
Permalink
Post by WM
Nevertheless set theory proves it. If you remove all elements from |N then you have removed |N. Or does some empty shell remain?
At no point have you removed all elements in your arguement. All your arguement says is that for any given n, you can remove all that is less than it and the union remains the same. That is not the same as removing all elements.
Post by WM
If you remove all elements from |N then you have removed |N.
Except you have not removed all elements, you have only shown that any arbitrary finite set of elements can be removed. A whole different proposition.
Post by WM
In fact it is rather nonsensical. But set theory proves it. If you remove all elements from |N then you have removed |N.
It does not, you are proving Ax(P(x)), not once P(|N).

This is your inability to do logic that you cannot understand the differens between those propositions.
Post by WM
Simply learn what set theory is based upon.
We know it already, learn how logic works so you can make an arguement that isn't fundamentally fallacious.
WM
2019-03-01 09:43:02 UTC
Permalink
Post by Zelos Malum
Post by WM
Nevertheless set theory proves it. If you remove all elements from |N then you have removed |N. Or does some empty shell remain?
At no point have you removed all elements in your arguement.
At no point have you collected all elements in any argument. But we have to assume that this is possible in set theory.
Post by Zelos Malum
All your arguement says is that for any given n, you can remove all that is less than it and the union remains the same. That is not the same as removing all elements.
Same with enumerating "all" rationals or with Cantor's list.
Post by Zelos Malum
Post by WM
If you remove all elements from |N then you have removed |N.
Except you have not removed all elements, you have only shown that any arbitrary finite set of elements can be removed. A whole different proposition.
Why does collecting all elements show more?
Post by Zelos Malum
Post by WM
In fact it is rather nonsensical. But set theory proves it. If you remove all elements from |N then you have removed |N.
It does not, you are proving Ax(P(x)), not once P(|N).
How should that be possible?
Post by Zelos Malum
This is your inability to do logic that you cannot understand the differens between those propositions.
Tell me where the difference appears and in particular why it does.
Post by Zelos Malum
Post by WM
Simply learn what set theory is based upon.
We know it already, learn how logic works so you can make an arguement that isn't fundamentally fallacious.
Teach me where the difference appears and in particular why and how something is "simultaneous" and something is not.

Regards, WM
Alan Smaill
2019-03-01 11:18:45 UTC
Permalink
Post by WM
Post by Zelos Malum
Post by WM
Nevertheless set theory proves it. If you remove all elements from
|N then you have removed |N. Or does some empty shell remain?
At no point have you removed all elements in your arguement.
At no point have you collected all elements in any argument. But we
have to assume that this is possible in set theory.
In particular, at no point have you collected all elements when using
proof by induction over the natural numbers. But in Mueckenheimia we
have to assume that the conclusion follows, by some miracle.
Post by WM
Regards, WM
--
Alan Smaill
Jew Lover
2019-03-01 12:09:30 UTC
Permalink
Post by Alan Smaill
Post by WM
Post by Zelos Malum
Post by WM
Nevertheless set theory proves it. If you remove all elements from
|N then you have removed |N. Or does some empty shell remain?
At no point have you removed all elements in your arguement.
At no point have you collected all elements in any argument. But we
have to assume that this is possible in set theory.
In particular, at no point have you collected all elements when using
proof by induction over the natural numbers. But in Mueckenheimia we
have to assume that the conclusion follows, by some miracle.
Don't you assume the same thing when you claim that pi = 3.14159... ?

A decimal representation is a *measure*. So are you not assuming the completed measure in this case? And if so, how can the measure be anything but a rational number in spite of the fact that we can prove there is no rational number which represents pi?
Post by Alan Smaill
Post by WM
Regards, WM
--
Alan Smaill
jvr
2019-03-01 11:20:29 UTC
Permalink
[...]
Post by WM
Teach me where the difference appears and in particular why and how something is "simultaneous" and something is not.
It is more likely that I can teach a donkey to recite the Psalms of David,
but let us demonstrate once more where the real difficulty lies:

Let S_n, n = 1,2, ..., be a sequence of sets s.t. S_n <subset> S_{n+1} for
every n.
Now clearly S = S_1 v S_2 v .... = S_n v S_{n+1} v .... for every n.
Notice that nothing is ever "removed from" S.

Your claim is that from this relationship you can deduce, using nothing
but the axioms of set theory, that S is empty.

All that can be said about such an obviously false conclusion is that, if
it is provable, then the axioms are inconsistent. But you haven't given
a proof. So where is your problem?
WM
2019-03-01 12:14:21 UTC
Permalink
Post by jvr
[...]
Post by WM
Teach me where the difference appears and in particular why and how something is "simultaneous" and something is not.
It is more likely that I can teach a donkey to recite the Psalms of David,
than you can any intelligent person your theorems like the following:

"You are apparently trying to appeal to a theorem that says that if a_n < A for all n then lim a_n =< A. This statement is false in the context;" [Jürgen Rennenkampff in "How many different paths can exist in the complete infinite Binary Tree?", sci.logic (15 Jul 2018)]

"There are points in the complement C that are neither endpoints of intervals nor interior points of C." [Jürgen Rennenkampff in "Clusters and Cantor dust", sci.logic (5 Jan 2019)]
Post by jvr
Your claim is that from this relationship you can deduce, using nothing
but the axioms of set theory, that S is empty.
I use in fact that the union of FISONs is |N.
Post by jvr
All that can be said about such an obviously false conclusion is that, if
it is provable, then the axioms are inconsistent. But you haven't given
a proof.
This proof has been established in collaboration with Franz Fritsche. If not all FISONs A_n can be removed from the set of FISONs to be unioned without changing the result of the union, then

∃n ∈ ℕ: U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} =/= U{A(n+1), A_(n+2), ...}.

But such a number n does not exist.

Q.E.D.

REgards, WM
jvr
2019-03-01 13:01:46 UTC
Permalink
Post by WM
Post by jvr
[...]
Post by WM
Teach me where the difference appears and in particular why and how something is "simultaneous" and something is not.
It is more likely that I can teach a donkey to recite the Psalms of David,
"You are apparently trying to appeal to a theorem that says that if a_n < A for all n then lim a_n =< A. This statement is false in the context;" [Jürgen Rennenkampff in "How many different paths can exist in the complete infinite Binary Tree?", sci.logic (15 Jul 2018)]
"There are points in the complement C that are neither endpoints of intervals nor interior points of C." [Jürgen Rennenkampff in "Clusters and Cantor dust", sci.logic (5 Jan 2019)]
Post by jvr
Your claim is that from this relationship you can deduce, using nothing
but the axioms of set theory, that S is empty.
I use in fact that the union of FISONs is |N.
Post by jvr
All that can be said about such an obviously false conclusion is that, if
it is provable, then the axioms are inconsistent. But you haven't given
a proof.
This proof has been established in collaboration with Franz Fritsche. If not all FISONs A_n can be removed from the set of FISONs to be unioned without changing the result of the union, then
∃n ∈ ℕ: U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} =/= U{A(n+1), A_(n+2), ...}.
But such a number n does not exist.
Q.E.D.
REgards, WM
As pointed out before, this is a simple logical error.
Take S = A v B v C. We cannot "remove all three summands without changing the result".
Nevertheless it is possible that A v B = B v C = C v A. I.e. none of the
summands is "necessary".
I.e. your conclusion "there exists n in N etc" is false.
WM
2019-03-01 14:59:30 UTC
Permalink
Post by jvr
Post by WM
Post by jvr
[...]
Post by WM
Teach me where the difference appears and in particular why and how something is "simultaneous" and something is not.
It is more likely that I can teach a donkey to recite the Psalms of David,
"You are apparently trying to appeal to a theorem that says that if a_n < A for all n then lim a_n =< A. This statement is false in the context;" [Jürgen Rennenkampff in "How many different paths can exist in the complete infinite Binary Tree?", sci.logic (15 Jul 2018)]
"There are points in the complement C that are neither endpoints of intervals nor interior points of C." [Jürgen Rennenkampff in "Clusters and Cantor dust", sci.logic (5 Jan 2019)]
Post by jvr
Your claim is that from this relationship you can deduce, using nothing
but the axioms of set theory, that S is empty.
I use in fact that the union of FISONs is |N.
Post by jvr
All that can be said about such an obviously false conclusion is that, if
it is provable, then the axioms are inconsistent. But you haven't given
a proof.
This proof has been established in collaboration with Franz Fritsche. If not all FISONs A_n can be removed from the set of FISONs to be unioned without changing the result of the union, then
∃n ∈ ℕ: U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} =/= U{A(n+1), A_(n+2), ...}.
But such a number n does not exist.
Q.E.D.
As pointed out before, this is a simple logical error.
Take S = A v B v C. We cannot "remove all three summands without changing the result".
The error is this: A union of FISONs can never yield an actually infinite set larger than every FISON.
Post by jvr
Nevertheless it is possible that A v B = B v C = C v A. I.e. none of the
summands is "necessary".
If the summands are well-ordered, then this is not possible. You had argued with this fallacy two years ago already:

When choosing the order

{3, 1} U {1, 2} U {2, 3} = {1, 2, 3}

we could drop {3, 1} but then {1, 2} is the first set necessary, because otherwise 1 would be missing in the union.

I am indebted to Mr. J. Rennenkampff for the instructive, although not inclusion monotonic, examples (*) and (**) [J. Rennenkampff in "Von seinen Jüngern verleugnet", de.sci.mathematik (20 Apr 2016)]

https://www.hs-augsburg.de/~mueckenh/Transfinity/Transfinity/pdf, p. 209.
Post by jvr
I.e. your conclusion "there exists n in N etc" is false.
This conclusion is false. Note that Cantor's theorem B concerns ordinal numbers and not the enumerated objects. We have to choose an order. In case of FISONs we can use the natural order or understand FISONs as ordinals according to von Neumann.

Regards, WM
j4n bur53
2019-03-01 15:08:35 UTC
Permalink
What is Cantors Theorem B. Could you please enlighten
us what you mean by Cantors Theorem B?

You use it all the time, but you never defined it so
far if I am not totally wrong.
Post by WM
Post by jvr
Post by WM
Post by jvr
[...]
Post by WM
Teach me where the difference appears and in particular why and how something is "simultaneous" and something is not.
It is more likely that I can teach a donkey to recite the Psalms of David,
"You are apparently trying to appeal to a theorem that says that if a_n < A for all n then lim a_n =< A. This statement is false in the context;" [Jürgen Rennenkampff in "How many different paths can exist in the complete infinite Binary Tree?", sci.logic (15 Jul 2018)]
"There are points in the complement C that are neither endpoints of intervals nor interior points of C." [Jürgen Rennenkampff in "Clusters and Cantor dust", sci.logic (5 Jan 2019)]
Post by jvr
Your claim is that from this relationship you can deduce, using nothing
but the axioms of set theory, that S is empty.
I use in fact that the union of FISONs is |N.
Post by jvr
All that can be said about such an obviously false conclusion is that, if
it is provable, then the axioms are inconsistent. But you haven't given
a proof.
This proof has been established in collaboration with Franz Fritsche. If not all FISONs A_n can be removed from the set of FISONs to be unioned without changing the result of the union, then
∃n ∈ ℕ: U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} =/= U{A(n+1), A_(n+2), ...}.
But such a number n does not exist.
Q.E.D.
As pointed out before, this is a simple logical error.
Take S = A v B v C. We cannot "remove all three summands without changing the result".
The error is this: A union of FISONs can never yield an actually infinite set larger than every FISON.
Post by jvr
Nevertheless it is possible that A v B = B v C = C v A. I.e. none of the
summands is "necessary".
When choosing the order
{3, 1} U {1, 2} U {2, 3} = {1, 2, 3}
we could drop {3, 1} but then {1, 2} is the first set necessary, because otherwise 1 would be missing in the union.
I am indebted to Mr. J. Rennenkampff for the instructive, although not inclusion monotonic, examples (*) and (**) [J. Rennenkampff in "Von seinen Jüngern verleugnet", de.sci.mathematik (20 Apr 2016)]
https://www.hs-augsburg.de/~mueckenh/Transfinity/Transfinity/pdf, p. 209.
Post by jvr
I.e. your conclusion "there exists n in N etc" is false.
This conclusion is false. Note that Cantor's theorem B concerns ordinal numbers and not the enumerated objects. We have to choose an order. In case of FISONs we can use the natural order or understand FISONs as ordinals according to von Neumann.
Regards, WM
j4n bur53
2019-03-01 15:10:27 UTC
Permalink
Please note that the Cantor-Bernstein-Schroeder

theorem deals with cardinality, and the theorem

doesn't involve any ordinals. So what is Theorem B?
Post by j4n bur53
What is Cantors Theorem B. Could you please enlighten
us what you mean by Cantors Theorem B?
You use it all the time, but you never defined it so
far if I am not totally wrong.
Post by WM
Post by jvr
Post by WM
Post by jvr
[...]
Post by WM
Teach me where the difference appears and in particular why and how something is "simultaneous" and something is not.
It is more likely that I can teach a donkey to recite the Psalms of David,
"You are apparently trying to appeal to a theorem that says that if a_n < A for all n then lim a_n =< A. This statement is false in the context;" [Jürgen Rennenkampff in "How many different paths can exist in the complete infinite Binary Tree?", sci.logic (15 Jul 2018)]
"There are points in the complement C that are neither endpoints of intervals nor interior points of C." [Jürgen Rennenkampff in "Clusters and Cantor dust", sci.logic (5 Jan 2019)]
Post by jvr
Your claim is that from this relationship you can deduce, using nothing
but the axioms of set theory, that S is empty.
I use in fact that the union of FISONs is |N.
Post by jvr
All that can be said about such an obviously false conclusion is that, if
it is provable, then the axioms are inconsistent. But you haven't given
a proof.
This proof has been established in collaboration with Franz Fritsche. If not all FISONs A_n can be removed from the set of FISONs to be unioned without changing the result of the union, then
∃n ∈ ℕ: U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} =/= U{A(n+1), A_(n+2), ...}.
But such a number n does not exist.
Q.E.D.
As pointed out before, this is a simple logical error.
Take S = A v B v C. We cannot "remove all three summands without changing the result".
The error is this: A union of FISONs can never yield an actually infinite set larger than every FISON.
Post by jvr
Nevertheless it is possible that A v B = B v C = C v A. I.e. none of the
summands is "necessary".
When choosing the order
{3, 1} U {1, 2} U {2, 3} = {1, 2, 3}
we could drop {3, 1} but then {1, 2} is the first set necessary, because otherwise 1 would be missing in the union.
I am indebted to Mr. J. Rennenkampff for the instructive, although not inclusion monotonic, examples (*) and (**) [J. Rennenkampff in "Von seinen Jüngern verleugnet", de.sci.mathematik (20 Apr 2016)]
https://www.hs-augsburg.de/~mueckenh/Transfinity/Transfinity/pdf, p. 209.
Post by jvr
I.e. your conclusion "there exists n in N etc" is false.
This conclusion is false. Note that Cantor's theorem B concerns ordinal numbers and not the enumerated objects. We have to choose an order. In case of FISONs we can use the natural order or understand FISONs as ordinals according to von Neumann.
Regards, WM
Jew Lover
2019-03-01 15:41:13 UTC
Permalink
Post by j4n bur53
What is Cantors Theorem B. Could you please enlighten
us what you mean by Cantors Theorem B?
You use it all the time, but you never defined it so
far if I am not totally wrong.
You can either be wrong or not. "Totally wrong" only happens in FOoL. In sound logic, one cannot be wrong proportionally. Chuckle.
Post by j4n bur53
Post by WM
Post by jvr
Post by WM
Post by jvr
[...]
Post by WM
Teach me where the difference appears and in particular why and how something is "simultaneous" and something is not.
It is more likely that I can teach a donkey to recite the Psalms of David,
"You are apparently trying to appeal to a theorem that says that if a_n < A for all n then lim a_n =< A. This statement is false in the context;" [Jürgen Rennenkampff in "How many different paths can exist in the complete infinite Binary Tree?", sci.logic (15 Jul 2018)]
"There are points in the complement C that are neither endpoints of intervals nor interior points of C." [Jürgen Rennenkampff in "Clusters and Cantor dust", sci.logic (5 Jan 2019)]
Post by jvr
Your claim is that from this relationship you can deduce, using nothing
but the axioms of set theory, that S is empty.
I use in fact that the union of FISONs is |N.
Post by jvr
All that can be said about such an obviously false conclusion is that, if
it is provable, then the axioms are inconsistent. But you haven't given
a proof.
This proof has been established in collaboration with Franz Fritsche. If not all FISONs A_n can be removed from the set of FISONs to be unioned without changing the result of the union, then
∃n ∈ ℕ: U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} =/= U{A(n+1), A_(n+2), ...}.
But such a number n does not exist.
Q.E.D.
As pointed out before, this is a simple logical error.
Take S = A v B v C. We cannot "remove all three summands without changing the result".
The error is this: A union of FISONs can never yield an actually infinite set larger than every FISON.
Post by jvr
Nevertheless it is possible that A v B = B v C = C v A. I.e. none of the
summands is "necessary".
When choosing the order
{3, 1} U {1, 2} U {2, 3} = {1, 2, 3}
we could drop {3, 1} but then {1, 2} is the first set necessary, because otherwise 1 would be missing in the union.
I am indebted to Mr. J. Rennenkampff for the instructive, although not inclusion monotonic, examples (*) and (**) [J. Rennenkampff in "Von seinen Jüngern verleugnet", de.sci.mathematik (20 Apr 2016)]
https://www.hs-augsburg.de/~mueckenh/Transfinity/Transfinity/pdf, p. 209.
Post by jvr
I.e. your conclusion "there exists n in N etc" is false.
This conclusion is false. Note that Cantor's theorem B concerns ordinal numbers and not the enumerated objects. We have to choose an order. In case of FISONs we can use the natural order or understand FISONs as ordinals according to von Neumann.
Regards, WM
WM
2019-03-01 16:42:19 UTC
Permalink
Post by j4n bur53
What is Cantors Theorem B. Could you please enlighten
us what you mean by Cantors Theorem B?
"Unter den Zahlen der Menge (') gibt es immer eine kleinste." [Cantor, p. 200]
Daß es in jeder Menge (') transfiniter Zahlen immer eine kleinste gibt, läßt sich folgendermaßen einsehen. [Cantor, p. 208f]
Satz B. "Jeder Inbegriff von verschiedenen Zahlen der ersten und zweiten Zahlenklasse hat eine kleinste Zahl, ein Minimum." [Cantor, p. 332]
"Würde nun der Index ' nicht alle Zahlen der zweiten Zahlenklasse durchlaufen, so müßte es eine kleinste Zahl  geben, die er nicht erreicht." [Cantor, p. 349]
"Aber aus den in § 13 über wohlgeordnete Mengen bewiesenen Sätzen folgt auch leicht, daß jede Vielheit von Zahlen, d. h. jeder Teil von  eine kleinste Zahl enthält." [Cantor, p. 444]
Post by j4n bur53
You use it all the time, but you never defined it so
far if I am not totally wrong.
I have defined it frequently, but obviously not yet often enough. Mr. Rennenkampff has not yet understood that is concerns ordinal numbers and not objects without order, although I told him years ago about this secret.

Regards, WM
j4n bur53
2019-03-01 18:43:53 UTC
Permalink
In:

Which would be:

(X,=<) wellordered <=> forall M (M subset X /\ M <> {} =>
exists x (x e M /\ forall y (y e M => x =< y)))

forall X exists =< (X,=<) wellordered

I have left out the ordinal thingy. Its not
necessary to formulate the well-ordering theorem.

So you have already two choices, and the 3rd
choice would include also some theorems about
ordinals.

What do you wish is Theorem B, choice 1), 2)
or choice 3)?
Thats not a definition. Thats a quote from Cantor.
Could you please define what Theorem B formally
means inside ZFC?
Quotes from some verbal bla bla are not mathematical
definitions. Also you are not citing a theorem B itself,
but also some proof attempst.
Could you only define the statement of the Theorem B,
not some proof?
"In mathematics, the well-ordering principle
states that every non-empty set of positive
integers contains a least element."
https://en.wikipedia.org/wiki/Well-ordering_principle
forall M (M subset |N /\ M <> {} =>
exists x (x e M /\ forall y (y e M => x =< y)))
"Every well-ordered set is uniquely order
isomorphic to a unique ordinal number, called the
order type of the well-ordered set. The well-ordering
theorem, which is equivalent to the axiom of choice,
states that every set can be well ordered."
https://en.wikipedia.org/wiki/Well-order#Ordinal_numbers
(X,=<) wellordered <=> forall M (M subset X /\ M <> {} =>
exists x (x e M /\ forall y (y e M => x =< y)))
forall X exists =< (X,=<) wellordered
Post by WM
Post by j4n bur53
What is Cantors Theorem B. Could you please enlighten
us what you mean by Cantors Theorem B?
"Unter den Zahlen der Menge (') gibt es immer eine kleinste." [Cantor, p. 200]
Daß es in jeder Menge (') transfiniter Zahlen immer eine kleinste gibt, läßt sich folgendermaßen einsehen. [Cantor, p. 208f]
Satz B. "Jeder Inbegriff von verschiedenen Zahlen der ersten und zweiten Zahlenklasse hat eine kleinste Zahl, ein Minimum." [Cantor, p. 332]
"Würde nun der Index ' nicht alle Zahlen der zweiten Zahlenklasse durchlaufen, so müßte es eine kleinste Zahl  geben, die er nicht erreicht." [Cantor, p. 349]
"Aber aus den in § 13 über wohlgeordnete Mengen bewiesenen Sätzen folgt auch leicht, daß jede Vielheit von Zahlen, d. h. jeder Teil von  eine kleinste Zahl enthält." [Cantor, p. 444]
Post by j4n bur53
You use it all the time, but you never defined it so
far if I am not totally wrong.
I have defined it frequently, but obviously not yet often enough. Mr. Rennenkampff has not yet understood that is concerns ordinal numbers and not objects without order, although I told him years ago about this secret.
Regards, WM
FredJeffries
2019-03-01 19:18:11 UTC
Permalink
Thats not a definition. Thats a quote from Cantor.
Could you please define what Theorem B formally
means inside ZFC?
He SEEMS to be referring to the Theorem B of section 16 (our Professor seems oblivious to the fact that Cantor repeats the indexing A, B, C, ... in each section) which appears on page 171 of "Contributions to the Founding of the Theory of Transfinite Numbers" which simply states "Every totality of different numbers of the first and second number-classes has a least number".

https://books.google.com/books?id=W1gNAAAAYAAJ
Me
2019-03-01 19:33:43 UTC
Permalink
Post by FredJeffries
"Every totality of different numbers of the first and second number-classes
has a least number".
Yeah! We (except Mückenheim, of course) have a word for this property:

https://en.wikipedia.org/wiki/Well-order
WM
2019-03-01 20:55:05 UTC
Permalink
Post by FredJeffries
"Every totality of different numbers of the first and second number-classes
has a least number".
But you do not understand what it means. Or have you learnt meanwhile that

∀n ∈ ℕ: U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} = U{A(n+1), A_(n+2), ...}.

Regards, WM
WM
2019-03-01 20:42:27 UTC
Permalink
Thats not a definition. Thats a quote from Cantor.
It is Cantor's theorem B.

Satz B. "Jeder Inbegriff von verschiedenen Zahlen der ersten und zweiten Zahlenklasse hat eine kleinste Zahl, ein Minimum." [Cantor, p. 332]
Could you please define what Theorem B formally
means inside ZFC?
It means precisely that what is written above - and need not be translated for you.
Also you are not citing a theorem B itself,
but also some proof attempst.
Try to sober up.

Regards, WM
j4n bur53
2019-03-03 02:17:34 UTC
Permalink
But how would you translate it into ZFC. There
is not "Zahlen der ersten und zweiten Zahlenklasse"
directly in ZFC.

https://en.wikipedia.org/wiki/Zermelo%E2%80%93Fraenkel_set_theory#Axioms

Where do you see "Zahlen der ersten und zweiten
Zahlenklasse" in the axioms of ZFC. Could
you enlighten us?
Post by WM
Thats not a definition. Thats a quote from Cantor.
It is Cantor's theorem B.
Satz B. "Jeder Inbegriff von verschiedenen Zahlen der ersten und zweiten Zahlenklasse hat eine kleinste Zahl, ein Minimum." [Cantor, p. 332]
Could you please define what Theorem B formally
means inside ZFC?
It means precisely that what is written above - and need not be translated for you.
Also you are not citing a theorem B itself,
but also some proof attempst.
Try to sober up.
Regards, WM
j4n bur53
2019-03-03 03:11:04 UTC
Permalink
Maybe should open a GitHub repository for WMs PDF.
And then start some issue tracking.

Issue #1: Botched Infinity Axiom.

Ha Ha

Could do the same for bird brain John Garbageiel.
In his case we would have:

Issue #1: 3=<4 Invalid Doesn't Make Sense
Post by j4n bur53
But how would you translate it into ZFC. There
is not "Zahlen der ersten und zweiten Zahlenklasse"
directly in ZFC.
https://en.wikipedia.org/wiki/Zermelo%E2%80%93Fraenkel_set_theory#Axioms
Where do you see "Zahlen der ersten und zweiten
Zahlenklasse" in the axioms of ZFC. Could
you enlighten us?
Post by WM
Thats not a definition. Thats a quote from Cantor.
It is Cantor's theorem B.
Satz B. "Jeder Inbegriff von verschiedenen Zahlen der ersten und zweiten Zahlenklasse hat eine kleinste Zahl, ein Minimum." [Cantor, p. 332]
Could you please define what Theorem B formally
means inside ZFC?
It means precisely that what is written above - and need not be translated for you.
Also you are not citing a theorem B itself,
but also some proof attempst.
Try to sober up.
Regards, WM
WM
2019-03-03 13:04:19 UTC
Permalink
Post by j4n bur53
But how would you translate it into ZFC. There
is not "Zahlen der ersten und zweiten Zahlenklasse"
directly in ZFC.
It is impossible to translate reasoning about contracictions into ZFC since ZFC is the language of Zero Findable Contradictions and is excluding anything of mathematical value.

Regards, WM
Python
2019-03-03 13:18:45 UTC
Permalink
Post by WM
Post by j4n bur53
But how would you translate it into ZFC. There
is not "Zahlen der ersten und zweiten Zahlenklasse"
directly in ZFC.
It is impossible to translate reasoning about contracictions into ZFC since ZFC is the language of Zero Findable Contradictions and is excluding anything of mathematical value.
Herr Mueckenheim you've just admitted that your sophistry need
equivocation and ZFC is precise enough to prevent your equivocation.
WM
2019-03-03 14:15:51 UTC
Permalink
Post by Python
Post by WM
Post by j4n bur53
But how would you translate it into ZFC. There
is not "Zahlen der ersten und zweiten Zahlenklasse"
directly in ZFC.
It is impossible to translate reasoning about contracictions into ZFC since ZFC is the language of Zero Findable Contradictions and is excluding anything of mathematical value.
Herr Mueckenheim you've just admitted that your sophistry need
equivocation and ZFC is precise enough to prevent your equivocation.
Is ZFC expressing and acknowledging the fact that the universal quantifier concerns only natural numbers that have more successors than predecessors, i.e., almost none?

Regards, WM
j4n bur53
2019-03-03 14:39:13 UTC
Permalink
Nope, in ZFC, the forall ranges over sets from
the domain. Read Zermelos 1908 paper to see
what a set theory domain means.
Post by WM
Post by Python
Post by WM
Post by j4n bur53
But how would you translate it into ZFC. There
is not "Zahlen der ersten und zweiten Zahlenklasse"
directly in ZFC.
It is impossible to translate reasoning about contracictions into ZFC since ZFC is the language of Zero Findable Contradictions and is excluding anything of mathematical value.
Herr Mueckenheim you've just admitted that your sophistry need
equivocation and ZFC is precise enough to prevent your equivocation.
Is ZFC expressing and acknowledging the fact that the universal quantifier concerns only natural numbers that have more successors than predecessors, i.e., almost none?
Regards, WM
WM
2019-03-03 19:23:21 UTC
Permalink
Post by j4n bur53
Nope, in ZFC, the forall ranges over sets from
the domain.
Look, this shows that Matheologians are even less intelligent than the least intelligent.

Note: Everybody, even if not very intelligent realizes, that you can only uwe natural numbers wnich have less predecessors than successors.

And even the less intelligent will understand that after 10 or 100 or 1000 trials, according to their level of intelligence.

But set theorists will not even understand that after an uncountable sequence of flops and claim they could chose all natural numbers.

It must be a miserable feeling to belong to this sect of fools. You have my sympathy.

Regards, WM
Python
2019-03-03 19:40:38 UTC
Permalink
Post by WM
Post by j4n bur53
Nope, in ZFC, the forall ranges over sets from
the domain.
Look, this shows that Matheologians are even less intelligent than the least intelligent.
Note: Everybody, even if not very intelligent realizes, that you can only uwe natural numbers wnich have less predecessors than successors.
Does it depends of the time of the day, crank Muckenheim? At 15:15
Central European Time you stated otherwise:

"... natural numbers that have more successors than predecessors,
i.e., almost none?"

Maybe it is dependant of the level of alcohol in your blood, Herr Crank?
j4n bur53
2019-03-03 21:00:40 UTC
Permalink
Well its "set theory" and not "black pudding and
liversausage theory". What you you expect that

the domain of discourse consists of? Volkswagen
Omlette from Augsburg Crank institute?
Post by WM
Post by j4n bur53
Nope, in ZFC, the forall ranges over sets from
the domain.
Look, this shows that Matheologians are even less intelligent than the least intelligent.
Note: Everybody, even if not very intelligent realizes, that you can only uwe natural numbers wnich have less predecessors than successors.
And even the less intelligent will understand that after 10 or 100 or 1000 trials, according to their level of intelligence.
But set theorists will not even understand that after an uncountable sequence of flops and claim they could chose all natural numbers.
It must be a miserable feeling to belong to this sect of fools. You have my sympathy.
Regards, WM
Python
2019-03-03 18:44:27 UTC
Permalink
Post by WM
Post by Python
Post by WM
Post by j4n bur53
But how would you translate it into ZFC. There
is not "Zahlen der ersten und zweiten Zahlenklasse"
directly in ZFC.
It is impossible to translate reasoning about contracictions into ZFC since ZFC is the language of Zero Findable Contradictions and is excluding anything of mathematical value.
Herr Mueckenheim you've just admitted that your sophistry need
equivocation and ZFC is precise enough to prevent your equivocation.
Is ZFC expressing and acknowledging the fact that the universal quantifier concerns only natural numbers that have more successors than predecessors, i.e., almost none?
Stop your idiotic babbling Muckenheim. Universal quantifier on all
naturals concerns all naturals -period.

All natural have more successors (an infinity) than predecessors (a
finite quantity), so it is not "almost none" but the contrary. Moreover,
as ALL of your sophistry, is is IRRELEVANT.
WM
2019-03-03 19:44:53 UTC
Permalink
Post by Python
Post by WM
Is ZFC expressing and acknowledging the fact that the universal quantifier concerns only natural numbers that have more successors than predecessors, i.e., almost none?
Stop your idiotic babbling Muckenheim. Universal quantifier on all
naturals concerns all naturals -period.
Chuckle, probably you will never understand. But every person of medium intelligence can tell you that it is impossible to choose a natural number that has more predecessors than successors.
Post by Python
All natural have more successors (an infinity) than predecessors (a
finite quantity)
And are these successors natural numbers like the predecessors?
Post by Python
Moreover,
as ALL of your sophistry, is is IRRELEVANT.
Every person of medium intelligence knows that there are inaccessible numbers if in every case the chosen number has more successors than predecessors. It must be a hard piece of work and willpower to condition the own brain to the contrary unless it is stupid by nature.

Regards, WM
Python
2019-03-03 20:04:24 UTC
Permalink
Post by WM
Post by Python
Post by WM
Is ZFC expressing and acknowledging the fact that the universal quantifier concerns only natural numbers that have more successors than predecessors, i.e., almost none?
Stop your idiotic babbling Muckenheim. Universal quantifier on all
naturals concerns all naturals -period.
Chuckle, probably you will never understand. But every person of medium intelligence can tell you that it is impossible to choose a natural number that has more predecessors than successors.
You are the one who pretented that there is "almost none" "natural
numbers that have more successors that predecessors", just read your
own post above... Now after a few more drinks you've changed your mind.
Nice. But it is still irrelevant by the way.
Post by WM
Post by Python
All natural have more successors (an infinity) than predecessors (a
finite quantity)
And are these successors natural numbers like the predecessors?
Post by Python
Moreover,
as ALL of your sophistry, is is IRRELEVANT.
Every person of medium intelligence knows that there are inaccessible numbers if in every case the chosen number has more successors than predecessors. It must be a hard piece of work and willpower to condition the own brain to the contrary unless it is stupid by nature.
You are high on drugs, Herr Crank Mueckenheim. Sad.
Me
2019-03-03 20:38:22 UTC
Permalink
Post by WM
it is impossible to choose a natural number that has more predecessors than
successors.
Indeed. Since each and every number has more successors than predecessors.
Post by WM
Post by Python
All natural have more successors (an infinity) than predecessors (a
finite quantity)
And are these successors natural numbers like the predecessors?
Of course, idiot. In IN this is indeed the case.
Me
2019-03-03 20:27:02 UTC
Permalink
[Each and every] natural number [has] more successors than predecessors
Indeed. Hint: Each and every natural number has INFINITELY many successors, but only FINITELY MANY predecessors.

In ZFC we can prove:

An e IN: card({0, ..., n-1}) = n
and
An e IN: card({n+1, n+2, ...}) = aleph_0 .

Moreover we can prove

An e IN: n < aleph_0 .
i.e. <nonsense deleted>
jvr
2019-03-01 13:16:31 UTC
Permalink
[...]
Post by WM
"You are apparently trying to appeal to a theorem that says that if a_n < A for all n then lim a_n =< A. This statement is false in the context;" [Jürgen Rennenkampff in "How many different paths can exist in the complete infinite Binary Tree?", sci.logic (15 Jul 2018)]
Indeed, Doktor Mückenheim, retired Professor of General Studies, that is
a fact. Would you like to know why I stipulated "in the context"?
Post by WM
"There are points in the complement C that are neither endpoints of intervals nor interior points of C." [Jürgen Rennenkampff in "Clusters and Cantor dust", sci.logic (5 Jan 2019)]
This is an elementary topological fact known since the days of Cantor.
Any math undergraduate who has learned a little topology can prove it.
WM
2019-03-01 15:10:30 UTC
Permalink
Post by jvr
[...]
Post by WM
"You are apparently trying to appeal to a theorem that says that if a_n < A for all n then lim a_n =< A. This statement is false in the context;" [Jürgen Rennenkampff in "How many different paths can exist in the complete infinite Binary Tree?", sci.logic (15 Jul 2018)]
Indeed, Doktor Mückenheim, retired Professor of General Studies
O, I am just alive and kicking and giving lectures.
Post by jvr
that is
a fact. Would you like to know why I stipulated "in the context"?
There is no context where the theorem could be false. Every context where it appears to be false is false.
Post by jvr
Post by WM
"There are points in the complement C that are neither endpoints of intervals nor interior points of C." [Jürgen Rennenkampff in "Clusters and Cantor dust", sci.logic (5 Jan 2019)]
This is an elementary topological fact known since the days of Cantor.
It is an elementary mistake comitted by matheologians who cannot think enough to understand that an infinite digit sequence does never define a real number or a point but who are too lazy or too much deceiving themselves to prove this impossibility to themselves.

Regards, WM
Jew Lover
2019-03-01 14:16:18 UTC
Permalink
Post by WM
Post by jvr
[...]
Post by WM
Teach me where the difference appears and in particular why and how something is "simultaneous" and something is not.
It is more likely that I can teach a donkey to recite the Psalms of David,
"You are apparently trying to appeal to a theorem that says that if a_n < A for all n then lim a_n =< A. This statement is false in the context;" [Jürgen Rennenkampff in "How many different paths can exist in the complete infinite Binary Tree?", sci.logic (15 Jul 2018)]
For all n terms the sequence 3; 3.1; 3.14; ... < pi, but somehow at infinity, it magically morphs into an imaginary number called "pi". Chuckle.

Euler's Blunder S = Lim S is the HIV of mathematics.
Post by WM
"There are points in the complement C that are neither endpoints of intervals nor interior points of C." [Jürgen Rennenkampff in "Clusters and Cantor dust", sci.logic (5 Jan 2019)]
Post by jvr
Your claim is that from this relationship you can deduce, using nothing
but the axioms of set theory, that S is empty.
I use in fact that the union of FISONs is |N.
Post by jvr
All that can be said about such an obviously false conclusion is that, if
it is provable, then the axioms are inconsistent. But you haven't given
a proof.
This proof has been established in collaboration with Franz Fritsche. If not all FISONs A_n can be removed from the set of FISONs to be unioned without changing the result of the union, then
∃n ∈ ℕ: U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} =/= U{A(n+1), A_(n+2), ...}.
But such a number n does not exist.
Q.E.D.
REgards, WM
Me
2019-02-27 22:29:13 UTC
Permalink
Post by WM
It is generally accepted that the union of the set of FISONs is
{1} U {1, 2} U {1, 2, 3} U ... = ℕ
or briefly
F_1 U F_2 U F_3 U ... = ℕ.
Hit: It's accepted because ut can be PROVED in the context of "set threory" (ay ZFC).
Post by WM
The first n FISONs can be omitted
F_(n+1) U F_(n+2) U ... = ℕ .
Right. Since you are dumb like shit, we better write this in symbols:

U_{i e IN\{1,...,n}} F_i = IN
Post by WM
Since this is true for all n, all F_n can be omitted and ...
No, idiot.

Hint: Non sequitur.
Me
2019-02-27 23:44:00 UTC
Permalink
Post by WM
It is generally accepted that the union of the set of FISONs is
{1} U {1, 2} U {1, 2, 3} U ... = ℕ
or briefly
F_1 U F_2 U F_3 U ... = ℕ.
Hint: It's accepted because it can be PROVED in the context of "set theory" (say ZFC).
Post by WM
The first n FISONs can be omitted
F_(n+1) U F_(n+2) U ... = ℕ .
Right.
Post by WM
Since this is true for all n, all F_n can be omitted and ...
No, idiot.

Hint: Non sequitur.
WM
2019-02-28 13:45:13 UTC
Permalink
Post by Me
Post by WM
It is generally accepted that the union of the set of FISONs is
{1} U {1, 2} U {1, 2, 3} U ... = ℕ
or briefly
F_1 U F_2 U F_3 U ... = ℕ.
Hint: It's accepted because it can be PROVED in the context of "set theory" (say ZFC).
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
Post by Me
Post by WM
The first n FISONs can be omitted
F_(n+1) U F_(n+2) U ... = ℕ .
Right.
Post by WM
Since this is true for all n, all F_n can be omitted and ...
No,
But all FISONs can be omitted, when the useless smaller ones are re-inserted?

Regards, WM
FredJeffries
2019-02-28 15:11:15 UTC
Permalink
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
Zeit Geist
2019-02-28 16:20:08 UTC
Permalink
Post by FredJeffries
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
Proof? What a proof? How do I start?

ZG
Jew Lover
2019-02-28 16:29:41 UTC
Permalink
Post by FredJeffries
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
The proof is simple and is in accordance with your mainstream ideas:

There are infinitely many FISONs F_i. All we need to believe is that an infinite process is possible. This is not a problem in your misguided theory because you claim that 3.14159... is the infinite decimal representation of the measure of that size known as pi.

Now pi - pi = 0. That is,

pi -(3+1/10+4/100+1/1000+...) = 0

which is only possible if 3+1/10+4/100+1/1000+... is pi.

ℕ - (F_1 U F_2 U F_3 U ...) = {}

which is only possible if F_1 U F_2 U F_3 U ...= ℕ.

Therefore, ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø.
j4n bur53
2019-02-28 16:44:06 UTC
Permalink
Thats an analogy, but not a proof.

All these cranks are not able to produce proofs.
Post by Jew Lover
Post by FredJeffries
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
There are infinitely many FISONs F_i. All we need to believe is that an infinite process is possible. This is not a problem in your misguided theory because you claim that 3.14159... is the infinite decimal representation of the measure of that size known as pi.
Now pi - pi = 0. That is,
pi -(3+1/10+4/100+1/1000+...) = 0
which is only possible if 3+1/10+4/100+1/1000+... is pi.
ℕ - (F_1 U F_2 U F_3 U ...) = {}
which is only possible if F_1 U F_2 U F_3 U ...= ℕ.
Therefore, ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø.
Jew Lover
2019-02-28 17:53:04 UTC
Permalink
Post by j4n bur53
Thats an analogy, but not a proof.
Just because you cannot understand simple proofs, does not mean they are invalid. One look at you and your last 10000 posts reveals you are a crank.

Now pi - pi = 0. That is,

pi -(3+1/10+4/100+1/1000+...) = 0

If you like, you can turn (3+1/10+4/100+1/1000+...) into a set of all the significant digits: { 3; 1; 4; 1; 5; 9; ...}.

You can't deny such a set exists which is not in accordance with your superstitious ZFC crap axioms.

Let FISOPDIGs (Finite sequences of pi digits).

The rest will be obvious to anyone who isn't blind.

which is only possible if { 3; 1; 4; 1; 5; 9; ...} is pi.

pi - { 3; 1; 4; 1; 5; 9; ...} = {}


which is only possible if {3} U {3; 1} U {3; 1; 4} U ...= pi.

Therefore, pi \ {3} U {3; 1} U {3; 1; 4} U ... = Ø.

If you claim this is false, then you cannot claim that

pi = { 3; 1; 4; 1; 5; 9; ...}

Jan Burse: troll, incredibly stupid moron, unemployed Swiss programmer and <whatever derisive term you can think of here>
Post by j4n bur53
All these cranks are not able to produce proofs.
Post by Jew Lover
Post by FredJeffries
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
There are infinitely many FISONs F_i. All we need to believe is that an infinite process is possible. This is not a problem in your misguided theory because you claim that 3.14159... is the infinite decimal representation of the measure of that size known as pi.
Now pi - pi = 0. That is,
pi -(3+1/10+4/100+1/1000+...) = 0
which is only possible if 3+1/10+4/100+1/1000+... is pi.
ℕ - (F_1 U F_2 U F_3 U ...) = {}
which is only possible if F_1 U F_2 U F_3 U ...= ℕ.
Therefore, ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø.
j4n bur53
2019-02-28 18:54:11 UTC
Permalink
Its still only an analogy, since the limit in

real numbers, does not behave as the infinite
union in sets.

Here is an example (in real numbers, base 2):

0.111... = 1.000...

But you don't have (in sets):

{1,2,3,...} <> {0}

Got it?
Post by Jew Lover
Post by j4n bur53
Thats an analogy, but not a proof.
Just because you cannot understand simple proofs, does not mean they are invalid. One look at you and your last 10000 posts reveals you are a crank.
Now pi - pi = 0. That is,
pi -(3+1/10+4/100+1/1000+...) = 0
If you like, you can turn (3+1/10+4/100+1/1000+...) into a set of all the significant digits: { 3; 1; 4; 1; 5; 9; ...}.
You can't deny such a set exists which is not in accordance with your superstitious ZFC crap axioms.
Let FISOPDIGs (Finite sequences of pi digits).
The rest will be obvious to anyone who isn't blind.
which is only possible if { 3; 1; 4; 1; 5; 9; ...} is pi.
pi - { 3; 1; 4; 1; 5; 9; ...} = {}
which is only possible if {3} U {3; 1} U {3; 1; 4} U ...= pi.
Therefore, pi \ {3} U {3; 1} U {3; 1; 4} U ... = Ø.
If you claim this is false, then you cannot claim that
pi = { 3; 1; 4; 1; 5; 9; ...}
Jan Burse: troll, incredibly stupid moron, unemployed Swiss programmer and <whatever derisive term you can think of here>
Post by j4n bur53
All these cranks are not able to produce proofs.
Post by Jew Lover
Post by FredJeffries
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
There are infinitely many FISONs F_i. All we need to believe is that an infinite process is possible. This is not a problem in your misguided theory because you claim that 3.14159... is the infinite decimal representation of the measure of that size known as pi.
Now pi - pi = 0. That is,
pi -(3+1/10+4/100+1/1000+...) = 0
which is only possible if 3+1/10+4/100+1/1000+... is pi.
ℕ - (F_1 U F_2 U F_3 U ...) = {}
which is only possible if F_1 U F_2 U F_3 U ...= ℕ.
Therefore, ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø.
j4n bur53
2019-02-28 18:59:00 UTC
Permalink
The following function from sets to real numbers,

is not an injection:

f : P(N) -> R

f(s) := Lim n->oo Sum_i=0^n s(i)*2^(-i)

You don't have s<>t => f(s)<>f(t).

So when there is no injection, then there is
hardly an isomorphism, then its hardly an analogy.

See also:

https://en.wikipedia.org/wiki/Injective_function

What is your analogy moron?
Post by j4n bur53
Its still only an analogy, since the limit in
real numbers, does not behave as the infinite
union in sets.
0.111... = 1.000...
{1,2,3,...} <> {0}
Got it?
Post by Jew Lover
Post by j4n bur53
Thats an analogy, but not a proof.
Just because you cannot understand simple proofs, does not mean they are invalid. One look at you and your last 10000 posts reveals you are a crank.
Now pi - pi = 0. That is,
pi -(3+1/10+4/100+1/1000+...) = 0
If you like, you can turn (3+1/10+4/100+1/1000+...) into a set of all the significant digits: { 3; 1; 4; 1; 5; 9; ...}.
You can't deny such a set exists which is not in accordance with your superstitious ZFC crap axioms.
Let FISOPDIGs (Finite sequences of pi digits).
The rest will be obvious to anyone who isn't blind.
which is only possible if { 3; 1; 4; 1; 5; 9; ...} is pi.
pi - { 3; 1; 4; 1; 5; 9; ...} = {}
which is only possible if {3} U {3; 1} U {3; 1; 4} U ...= pi.
Therefore, pi \ {3} U {3; 1} U {3; 1; 4} U ... = Ø.
If you claim this is false, then you cannot claim that
pi = { 3; 1; 4; 1; 5; 9; ...}
Jan Burse: troll, incredibly stupid moron, unemployed Swiss programmer and <whatever derisive term you can think of here>
Post by j4n bur53
All these cranks are not able to produce proofs.
Post by Jew Lover
Post by FredJeffries
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
There are infinitely many FISONs F_i. All we need to believe is that an infinite process is possible. This is not a problem in your misguided theory because you claim that 3.14159... is the infinite decimal representation of the measure of that size known as pi.
Now pi - pi = 0. That is,
pi -(3+1/10+4/100+1/1000+...) = 0
which is only possible if 3+1/10+4/100+1/1000+... is pi.
ℕ - (F_1 U F_2 U F_3 U ...) = {}
which is only possible if F_1 U F_2 U F_3 U ...= ℕ.
Therefore, ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø.
j4n bur53
2019-02-28 19:16:26 UTC
Permalink
Its only a soft analogy.
Post by j4n bur53
The following function from sets to real numbers,
f : P(N) -> R
f(s) := Lim n->oo Sum_i=0^n s(i)*2^(-i)
You don't have s<>t => f(s)<>f(t).
So when there is no injection, then there is
hardly an isomorphism, then its hardly an analogy.
https://en.wikipedia.org/wiki/Injective_function
What is your analogy moron?
Post by j4n bur53
Its still only an analogy, since the limit in
real numbers, does not behave as the infinite
union in sets.
0.111... = 1.000...
{1,2,3,...} <> {0}
Got it?
Post by Jew Lover
Post by j4n bur53
Thats an analogy, but not a proof.
Just because you cannot understand simple proofs, does not mean they are invalid. One look at you and your last 10000 posts reveals you are a crank.
Now pi - pi = 0. That is,
pi -(3+1/10+4/100+1/1000+...) = 0
If you like, you can turn (3+1/10+4/100+1/1000+...) into a set of all the significant digits: { 3; 1; 4; 1; 5; 9; ...}.
You can't deny such a set exists which is not in accordance with your superstitious ZFC crap axioms.
Let FISOPDIGs (Finite sequences of pi digits).
The rest will be obvious to anyone who isn't blind.
which is only possible if { 3; 1; 4; 1; 5; 9; ...} is pi.
pi - { 3; 1; 4; 1; 5; 9; ...} = {}
which is only possible if {3} U {3; 1} U {3; 1; 4} U ...= pi.
Therefore, pi \ {3} U {3; 1} U {3; 1; 4} U ... = Ø.
If you claim this is false, then you cannot claim that
pi = { 3; 1; 4; 1; 5; 9; ...}
Jan Burse: troll, incredibly stupid moron, unemployed Swiss programmer and <whatever derisive term you can think of here>
Post by j4n bur53
All these cranks are not able to produce proofs.
Post by Jew Lover
Post by FredJeffries
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
There are infinitely many FISONs F_i. All we need to believe is that an infinite process is possible. This is not a problem in your misguided theory because you claim that 3.14159... is the infinite decimal representation of the measure of that size known as pi.
Now pi - pi = 0. That is,
pi -(3+1/10+4/100+1/1000+...) = 0
which is only possible if 3+1/10+4/100+1/1000+... is pi.
ℕ - (F_1 U F_2 U F_3 U ...) = {}
which is only possible if F_1 U F_2 U F_3 U ...= ℕ.
Therefore, ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø.
Jew Lover
2019-02-28 20:28:23 UTC
Permalink
Post by j4n bur53
Its still only an analogy,
It's a proof, you stupid. And yes, it is a proof for an analogy which infers that WM's proof is correct.
Post by j4n bur53
since the limit in real numbers, does not behave as the infinite
union in sets.
Really?!!! What about Dedekind Cuts and Cauchy sequences? Gosh, you are a moron, aren't you!
Post by j4n bur53
0.111... = 1.000...
This is nonsense. Not even worthy to be called anything else.
j4n bur53
2019-02-28 21:26:10 UTC
Permalink
This is how real numnbers are constructed. If they
were the same as sets, you wouldn't need the construction.

https://en.wikipedia.org/wiki/Construction_of_the_real_numbers
Post by j4n bur53
0.111... = 1.000...
WM
2019-02-28 18:12:14 UTC
Permalink
Post by FredJeffries
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
I will do it, but first let me know whether you will aceept it.

What is the union of all FISONs, F_1 U F_2 U F_3 U ..., in your opinion?

REgards, WM
FredJeffries
2019-02-28 20:15:30 UTC
Permalink
Post by WM
Post by FredJeffries
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
I will do it, but first let me know whether you will aceept it.
Why should that make any difference? According to you I am "brain-damaged".

But I am not fool enough to say that I will "aceept[sic]" any alleged "proof" before I see it.
Post by WM
What is the union of all FISONs, F_1 U F_2 U F_3 U ..., in your opinion?
Until I see a (convincing) proof or refutation, I have no "opinion" about ANY (reputed) mathematical statement.
Post by WM
REgards, WM
Jew Lover
2019-02-28 20:30:01 UTC
Permalink
Post by FredJeffries
Post by WM
Post by FredJeffries
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
I will do it, but first let me know whether you will aceept it.
Why should that make any difference?
Because deceptive reptiles like you will never accept a proof and even if a proof is provided, you will then retort that you did not accept the initial assumption.

Get it stupid?
Post by FredJeffries
According to you I am "brain-damaged".
Also according to me. Chuckle.
Post by FredJeffries
But I am not fool enough to say that I will "aceept[sic]" any alleged "proof" before I see it.
Post by WM
What is the union of all FISONs, F_1 U F_2 U F_3 U ..., in your opinion?
Until I see a (convincing) proof or refutation, I have no "opinion" about ANY (reputed) mathematical statement.
Post by WM
REgards, WM
FredJeffries
2019-03-02 15:59:55 UTC
Permalink
Post by FredJeffries
Post by WM
Post by FredJeffries
Post by WM
It can also be proved that ℕ \ (F_1 U F_2 U F_3 U ... ) = Ø
I call your bluff: PROVE IT
I will do it, but first let me know whether you will aceept it.
Why should that make any difference? According to you I am "brain-damaged".
But I am not fool enough to say that I will "aceept[sic]" any alleged "proof" before I see it.
Post by WM
What is the union of all FISONs, F_1 U F_2 U F_3 U ..., in your opinion?
Until I see a (convincing) proof or refutation, I have no "opinion" about ANY (reputed) mathematical statement.
Post by WM
REgards, WM
So, once again, we'll just consider your refusal to supply a "proof" to be an admission that you CANNOT do so and that your claims are complete nonsense. Thank you for clearing up THAT issue.
Zelos Malum
2019-02-28 07:01:34 UTC
Permalink
Post by WM
Since this is true for all n, all F_n can be omitted and we find that no FISONs are necessary but
This is where you go wrong, Ax(P(x)) is not the same as P(|N), you have only gotten the former, not the latter.
Post by WM
This result makes the mathematical reality of the transfinite set ℕ quite doubtful. Therefore it is not acceptable for adherents of transfinite set theory.
The only thing it makes doubtful is your understanding of mathematics which we already know you have none.
Post by WM
We do not want to spoil their belief. But students who are not yet closely connected with set theory will perhaps give it some thought whether to get in closer touch with this persuasion.
I think a better thing would you taking some courses and talk to professors that are knowledgable.
WM
2019-02-28 13:45:23 UTC
Permalink
Post by Zelos Malum
Post by WM
Since this is true for all n, all F_n can be omitted and we find that no FISONs are necessary but
This is where you go wrong, Ax(P(x)) is not the same as P(|N), you have only gotten the former, not the latter.
If you remove all elements from |N then you have removed |N.
Regards, WM
j4n bur53
2019-02-28 13:49:01 UTC
Permalink
Also your nonsense is even a counter example,
to your fallacy. This means its a row in the
truth table with "F":

/* WMs Law, a Fallacy */

forall n e N P(n) => P(N)

Just use for P, the following predication, where
x can be either a finite Neuman ordinal x={0,..,n-1}=n,
or the least limit Neuman ordinal omega={0,1,2,...}=N.

Q(x) = N \ x <> {}

The we have:

forall n e N Q(n)

And also:

~Q(N)

So you produced your own counter example, showing
that your WM law is a fallacy. Thank you!
Post by WM
Post by Zelos Malum
Post by WM
Since this is true for all n, all F_n can be omitted and we find that no FISONs are necessary but
This is where you go wrong, Ax(P(x)) is not the same as P(|N), you have only gotten the former, not the latter.
If you remove all elements from |N then you have removed |N.
Regards, WM
j4n bur53
2019-02-28 13:50:38 UTC
Permalink
To avoid confusion, I guess I have
to wrote the WMs Law counter example with
parenthesis:

Q(x) = (N \ x <> {})

Or in words:

Q(x) is true iff
x subtracted from N is non-empty
Post by j4n bur53
Also your nonsense is even a counter example,
to your fallacy. This means its a row in the
/* WMs Law, a Fallacy */
forall n e N P(n) => P(N)
Just use for P, the following predication, where
x can be either a finite Neuman ordinal x={0,..,n-1}=n,
or the least limit Neuman ordinal omega={0,1,2,...}=N.
Q(x) = N \ x <> {}
forall n e N Q(n)
~Q(N)
So you produced your own counter example, showing
that your WM law is a fallacy. Thank you!
Post by WM
Post by Zelos Malum
Post by WM
Since this is true for all n, all F_n can be omitted and we find that no FISONs are necessary but
This is where you go wrong, Ax(P(x)) is not the same as P(|N), you have only gotten the former, not the latter.
If you remove all elements from |N then you have removed |N.
Regards, WM
WM
2019-02-28 14:01:27 UTC
Permalink
Post by j4n bur53
Also your nonsense is even a counter example,
to your fallacy. This means its a row in the
/* WMs Law, a Fallacy */
forall n e N P(n) => P(N)
Simply learn what set theory is based upon.

If you remove all elements from |N then you have removed the set |N.

If you biject all elements of Q with elements of |N, then you biject the sets Q and |N.

That's set theory.

It seems that you have a good taste for what is nonsense but a bad knowledge of set theory.

Regards, WM
j4n bur53
2019-02-28 14:09:01 UTC
Permalink
Well I take your word. "If you remove all
elements from |N then you have removed the set |N."
Now take:

Q(x) is true iff
x subtracted from N is non-empty

Therefore:

Q(N)=F, well easy, N\N = {},
and it is not {}<>{}

But also:

forall n e N Q(n)=T, well easy, N\n = {n+1,...},
and it is {n+1,..}<>{}

This violates your WMs Law. Because your WMs
Law would say, before applied to Q, if it were a law,
only the rows with "T" would be possible:

forall n e N P(n) P(N) forall n e N P(n) => P(N)
F F T
F T T
T T T

But we have just produced a counter example,
namely we found forall n e N Q(n)=T and Q(N)=F,
violating the law:

forall n e N Q(n) Q(N) forall n e N Q(n) => Q(N)
T F F

So you produced your own counter example. Thank you!
Post by WM
Post by j4n bur53
Also your nonsense is even a counter example,
to your fallacy. This means its a row in the
/* WMs Law, a Fallacy */
forall n e N P(n) => P(N)
Simply learn what set theory is based upon.
If you remove all elements from |N then you have removed the set |N.
If you biject all elements of Q with elements of |N, then you biject the sets Q and |N.
That's set theory.
It seems that you have a good taste for what is nonsense but a bad knowledge of set theory.
Regards, WM
j4n bur53
2019-02-28 14:10:02 UTC
Permalink
WM, are you L^3 type? Lausig Lange Leitung?
Post by j4n bur53
Well I take your word. "If you remove all
elements from |N then you have removed the set |N."
Q(x) is true iff
x subtracted from N is non-empty
Q(N)=F, well easy, N\N = {},
and it is not {}<>{}
forall n e N Q(n)=T, well easy, N\n = {n+1,...},
and it is {n+1,..}<>{}
This violates your WMs Law. Because your WMs
Law would say, before applied to Q, if it were a law,
forall n e N P(n) P(N) forall n e N P(n) => P(N)
F F T
F T T
T T T
But we have just produced a counter example,
namely we found forall n e N Q(n)=T and Q(N)=F,
forall n e N Q(n) Q(N) forall n e N Q(n) => Q(N)
T F F
So you produced your own counter example. Thank you!
Post by WM
Post by j4n bur53
Also your nonsense is even a counter example,
to your fallacy. This means its a row in the
/* WMs Law, a Fallacy */
forall n e N P(n) => P(N)
Simply learn what set theory is based upon.
If you remove all elements from |N then you have removed the set |N.
If you biject all elements of Q with elements of |N, then you biject the sets Q and |N.
That's set theory.
It seems that you have a good taste for what is nonsense but a bad knowledge of set theory.
Regards, WM
WM
2019-02-28 18:11:53 UTC
Permalink
Post by j4n bur53
Well I take your word. "If you remove all
elements from |N then you have removed the set |N."
...
This violates your WMs Law.
Then set theory is violated because then also this would be wrong: "If you combine all natural numbers (elements of |N) then you have built the set |N."
Post by j4n bur53
So you produced your own counter example. Thank you!
It's set theory that produces its own counter examples.
Post by j4n bur53
Post by WM
If you remove all elements from |N then you have removed the set |N.
If you biject all elements of Q with elements of |N, then you biject the sets Q and |N.
That's set theory.
It seems that you have a good taste for what is nonsense but a bad knowledge of set theory.
Regards, WM
j4n bur53
2019-02-28 19:06:26 UTC
Permalink
You still don't get what it means "if a theory
doesn't claim a law". It doesn't mean that there
cannot be some cases where the rule can

nevertheless be observed. It is not that when a
theory doesn't claim a law, it automatically claims
the negation of a law.

What is wrong with you? Too much booze again?

Are all people in Augsburg that debilated?
Do you even understand a single word english
or are you dumb like a stone?
Post by WM
Post by j4n bur53
Well I take your word. "If you remove all
elements from |N then you have removed the set |N."
...
This violates your WMs Law.
Then set theory is violated because then also this would be wrong: "If you combine all natural numbers (elements of |N) then you have built the set |N."
Post by j4n bur53
So you produced your own counter example. Thank you!
It's set theory that produces its own counter examples.
Post by j4n bur53
Post by WM
If you remove all elements from |N then you have removed the set |N.
If you biject all elements of Q with elements of |N, then you biject the sets Q and |N.
That's set theory.
It seems that you have a good taste for what is nonsense but a bad knowledge of set theory.
Regards, WM
K_h
2019-03-01 04:57:19 UTC
Permalink
Post by WM
Post by j4n bur53
This violates your WMs Law.
Then set theory is violated because then also this would be
wrong: "If you combine all natural numbers (elements of |N)
then you have built the set |N."
Hello WM. It has been a while. The statement for all n e N, P(n) --> P(N)
cannot be true generally because simple counter examples can be offered.
For instance all natural numbers greater than 1 have a predecessor but
w=omega=N does not have a predecessor (although in this example P(0) would
be false too since it has no predecessor). But you get the idea.

x
WM
2019-03-01 08:42:49 UTC
Permalink
Post by K_h
Post by WM
Post by j4n bur53
This violates your WMs Law.
Then set theory is violated because then also this would be
wrong: "If you combine all natural numbers (elements of |N)
then you have built the set |N."
Hello WM. It has been a while. The statement for all n e N, P(n) --> P(N)
cannot be true generally because simple counter examples can be offered.
Of course! the union of all natural numbers does not yield a complete fixed set larger than all FISONs. That is impossible by the fact that for every n there is an n+1. See my animation on slide 57 of my lesson https://www.hs-augsburg.de/~mueckenh/HI/HI12.PPT: It is impossible to collect all natural numbers within the blue cube, if number n may leave the intermediate reservoir (the yellow hatbox) only after n+1 has arrived there. A completely natural requirement.
Post by K_h
For instance all natural numbers greater than 1 have a predecessor but
w=omega=N does not have a predecessor (although in this example P(0) would
be false too since it has no predecessor). But you get the idea.
I got it long ago and try to extinguish it. It is impossible to enumerate all rational numbers. See Not enumerating all positive rational numbers (formal proof) on p. 254 of https://www.hs-augsburg.de/~mueckenh/Transfinity/Transfinity/pdf

But set theory uses this falsity.

Regards, WM
K_h
2019-03-01 20:23:54 UTC
Permalink
Post by WM
Of course! the union of all natural numbers does not yield a complete
fixed set larger than all FISONs.
There are an infinite number of natural numbers. Proof: the number of
natural numbers is not finite. By definition, anything which is not finite
is infinite. So N is an infinite set. QED. Trivially, the union of all
initial segments of the natural numbers yields the set N:

{0} U {0,1} U {0,1,2} U {0,1,2,3} U {0,1,2,3,4} U {0,1,2,3,4,5} U ... = N

The union of all natural numbers also yields the set N:

{0} U {1} U {2} U {3} U {4} U {5} U {6} U {7} U {8} U {9} U ... = N

In both cases there are an infinite number of sets in the union. Nobody
ever claimed that one of these unions would result in a bigger set than the
other.

k
WM
2019-03-01 20:48:43 UTC
Permalink
Post by K_h
Post by WM
Of course! the union of all natural numbers does not yield a complete
fixed set larger than all FISONs.
There are an infinite number of natural numbers.
Of course. But there is no fixed quantity, namely a set that is the union of all FISONs and is larger than all FISONs.
Post by K_h
{0} U {0,1} U {0,1,2} U {0,1,2,3} U {0,1,2,3,4} U {0,1,2,3,4,5} U ... = N
No that is blatantly wrong. A union of inclusion-monotonic sets cannot be larger than all sets. |N may be understood as the limit but not as the union. It is like 0.999... that is an infinite sequence convergi ng towards the limit 1.
Post by K_h
{0} U {1} U {2} U {3} U {4} U {5} U {6} U {7} U {8} U {9} U ... = N
That is the original mistake but not so easy to contradictc as the first one:

In {0} U {0,1} U {0,1,2} U {0,1,2,3} U {0,1,2,3,4} U {0,1,2,3,4,5} U ... = N all FISONs can be omitted without changing the result, yielding U{ } = |N.

Regards, WM
K_h
2019-03-03 00:19:13 UTC
Permalink
Post by WM
Of course. But there is no fixed quantity, namely a set that is the
union of all FISONs and is larger than all FISONs.
N is the set that is the union of all of its initial segments and N is
larger than any of its initial segments. To see this, just note that
CARD(N)=ALEPH_0 and card(n)=n for any natural number n and n<ALEPH_0 for any
natural number n.
Post by WM
Post by K_h
{0} U {0,1} U {0,1,2} U {0,1,2,3} U {0,1,2,3,4} U {0,1,2,3,4,5} U ...
= N
No that is blatantly wrong. A union of inclusion-monotonic sets cannot
be larger than all sets. |N may be understood as the limit but not as
the union. It is like 0.999... that is an infinite sequence converging
towards the limit 1.
{0} U {0,1} U {0,1,2} U {0,1,2,3} U {0,1,2,3,4} U {0,1,2,3,4,5} U ... = N

No, what I wrote is blatantly correct. It is a theorem of ZF that if L is a
limit ordinal then UL=L (the union of the sets in L equals L itself). A
proof of this can be found on page 210 of the textbook "Classic Set Theory"
by Derek Goldrei. In this example, think of it this way: pick any natural
number you want out of the set N (the right-hand side of the above equation)
and you can find the first set which includes it on the left-hand side of
the same above equation. In fact, once you have found the first set that
includes it then all subsequent sets in this ordered union also includes it.
It is true that no set on the left-hand side of the equation includes all
the members in N but there are an infinite number of such sets which is why
the equation is true. Note that each member of N can be found on the
left-hand side by simply looking at the last member in each set. Also note
that the below equation is true:

{0} U {1} U {2} U {3} U {4} U {5} U {6} U {7} U {8} U {9} U ... = N

because

{0} U {1} U {2} U {3} U {4} U {5} U {6} U {7} U {8} U {9} U ... =
{0,1,2,3,4,5,6,7,8,9,...}

and {0,1,2,3,4,5,6,7,8,9,...} = N.
Post by WM
In {0} U {0,1} U {0,1,2} U {0,1,2,3} U {0,1,2,3,4} U {0,1,2,3,4,5} U ... =
N
all FISONs can be omitted without changing the result, yielding U{ } = |N.
No. If each set in the union is omitted then no union is taking place at
all. U{}={} since there are no sets in the empty set and taking the union
of nothing yields nothing.

k
WM
2019-03-03 13:00:34 UTC
Permalink
"WM" wrote in message
Post by WM
Of course. But there is no fixed quantity, namely a set that is the
union of all FISONs and is larger than all FISONs.
N is the set that is the union of all of its initial segments and N is
larger than any of its initial segments.
Therefore it cannot be the union.
Post by WM
No that is blatantly wrong. A union of inclusion-monotonic sets cannot
be larger than all sets. |N may be understood as the limit but not as
the union. It is like 0.999... that is an infinite sequence converging
towards the limit 1.
{0} U {0,1} U {0,1,2} U {0,1,2,3} U {0,1,2,3,4} U {0,1,2,3,4,5} U ... = N
No, what I wrote is blatantly correct.
It yields the contradiction that also when subtracting FISONs from the set {{0}, {0,1}, {0,1,2}, {0,1,2,3} ...} under the premise that the union remains unchanged, no FISON remains. Therefore either |N is more than the union or |N is nothing, i.e., the empty set.
It is a theorem of ZF that if L is a
limit ordinal then UL=L (the union of the sets in L equals L itself).
That theorem is wrong.

Look: Uneducated mathematicians believe that the limit of a sequence is always a term of the sequence.

Educated mathematicians understand that the limit of a series is not one of the partial sums (although they often are not aware of that fact without being told).

Even very well educated mathematicians do not understand that the infinite union of inclusion monotonic sets cannot be a fixed set larger than each of the unioned sets. But it is fact. The infinite union of FISONs has the limit |N, but it is not |N.

Analogy: The sequence 1, 1/2, 1/3, ..., if finitely defined by (1/n), has the limit 0. This limit exists by the finite definition and does not change when you delete terms of the sequence, even when you delete all.
A
proof of this can be found on page 210 of the textbook "Classic Set Theory"
by Derek Goldrei.
It cannot be proved, since it is wrong.
In this example, think of it this way: pick any natural
number you want out of the set N
That is already the first mistake. You cannot pick "any" number. Each one that you can pick belongs to a tiny finite initial segment which is followed by infinitely many natural numbers. Try to refute me.
(the right-hand side of the above equation)
and you can find the first set which includes it on the left-hand side of
the same above equation.
Ex falso quodlibet. Before going on show me that you can pick a natural number that has more predecessors than successors.
Post by WM
In {0} U {0,1} U {0,1,2} U {0,1,2,3} U {0,1,2,3,4} U {0,1,2,3,4,5} U ... =
N
all FISONs can be omitted without changing the result, yielding U{ } = |N.
No. If each set in the union is omitted then no union is taking place at
all.
Obviously that is not required if |N is not that union.
U{}={} since there are no sets in the empty set and taking the union
of nothing yields nothing.
Every set of ordinals has a first element. The set of all FISONs is not required. If there are FISONs required, then this required subset has a first element. That, by the way, is basic for set theory.

REgards, WM
Me
2019-03-03 13:38:29 UTC
Permalink
Post by WM
N is [...] the union of all of its initial segments and N is
larger than any of its initial segments.
Therefore it cannot be the union.
"Therefore" for you obviously means: "be aware of the following nonsense".
Post by WM
{0} U {0,1} U {0,1,2} U {0,1,2,3} U {0,1,2,3,4} U {0,1,2,3,4,5} U ... = N
It yields the contradiction that <bla>
No, it doesn't "yield a contradiction". At least none that is (presently) known.
Post by WM
It is a theorem of ZF that if L is a
limit ordinal then UL=L (the union of the sets in L equals L itself).
That theorem is wrong.
Huh?!

What do you mean by "wrong"?

"I don't like it!" Or: "I can't prove it in Mückenmatic!"? Or what?

Hint: It holds in the context of SET THEORY, you know.
Post by WM
The sequence 1, 1/2, 1/3, ... [...] has the limit 0.
This limit [...] does not change when you delete terms of the sequence,
even when you delete all.
Fascinating! Do you teach this type of stuff?
Post by WM
A proof of this can be found on page 210 of the textbook "Classic Set
Theory" by Derek Goldrei.
It cannot be proved, since <bla>
Can't you read, or what's the matter with you, imbecile?

*** A proof of this can be found on page 210 of the textbook "Classic Set Theory" by Derek Goldrei ***
Post by WM
show me that you can pick a natural number that has more predecessors than
successors.
There is no such number, your requirement cannot be satisfied by any natural number. Hence he can't perfom that feat. :-)
Post by WM
If each set in the union is omitted then no union is taking place at
all.
Right:. U{} = {}.
Post by WM
Obviously that is <bla>
Shut up, idiot!
Post by WM
Every set of ordinals has a first element.
No, idiot: Every NON EMPTY set of ordinals has a first element.
WM
2019-03-03 14:08:59 UTC
Permalink
Post by Me
Post by WM
Post by K_h
{0} U {0,1} U {0,1,2} U {0,1,2,3} U {0,1,2,3,4} U {0,1,2,3,4,5} U ... = N
No, it doesn't "yield a contradiction". At least none that is (presently) known.
What about the different results of
U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} =/= |N
and
U{A(n+1), A_(n+2), ...} =/= |N
?
Post by Me
Post by WM
Post by K_h
It is a theorem of ZF that if L is a
limit ordinal then UL=L (the union of the sets in L equals L itself).
That theorem is wrong.
What do you mean by "wrong".
Its proof is based on a fallacy.
Post by Me
Post by WM
The sequence 1, 1/2, 1/3, ... [...] has the limit 0.
This limit [...] does not change when you delete terms of the sequence,
even when you delete all.
Fascinating! Do you teach this type of stuff?
Is that necessary? I never met a person who doubted that.
Post by Me
Post by WM
Post by K_h
A proof of this can be found on page 210 of the textbook "Classic Set
Theory" by Derek Goldrei.
It cannot be proved.
*** A proof of this can be found on page 210 of the textbook "Classic Set Theory" by Derek Goldrei ***
It may be sufficient to convince stupids who do not understand that it is impossible to choose every natural number.
Post by Me
Post by WM
show me that you can pick a natural number that has more predecessors than
successors.
There is no such number, your requirement cannot be satisfied by any natural number. Hence he can't perfom that feat.
Why then do matheologians boastfully claim they could choose every natural number?
Post by Me
Post by WM
Every set of ordinals has a first element.
No: Every NON EMPTY set of ordinals has a first element.
That shows that the set of FISONs U{A(n+1), A_(n+2), ...} that is required to yield the union |N is empty.

Regards, WM
Me
2019-03-03 20:33:16 UTC
Permalink
What's about the different results of
U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} =/= |N
and
U{A(n+1), A_(n+2), ...} =/= |N
Huh? Two false statments. So what?

Hint: An e IN: U{A_1, A_2, ..., A_(n-1), A(n+1), A_(n+2), ...} = |N
and: An e IN: U{A(n+1), A_(n+2), ...} = |N .
Post by Me
Post by WM
The sequence 1, 1/2, 1/3, ... [...] has the limit 0.
This limit [...] does not change when you delete terms of the sequence,
even when you delete all. (Mückenheim)
Fascinating! Do you teach this type of stuff?
[...] I never met a person who doubted that.
Oh really? Fascinating!
Post by Me
Post by WM
Every set of ordinals has a first element. (Mückenheim)
No: Every NON EMPTY set of ordinals has a first element.
Got it?
Me
2019-02-28 23:09:23 UTC
Permalink
Post by WM
Simply learn what set theory is based upon.
Look, idiot, you know SHIT about set theory.

Hence you better shut up!
No one
2019-02-28 23:17:02 UTC
Permalink
Post by WM
It is generally accepted that the union of the set of FISONs is
{1} U {1, 2} U {1, 2, 3} U ... = ℕ
or briefly
F_1 U F_2 U F_3 U ... = ℕ.
The first n FISONs can be omitted
F_n U F_(n+1) U F_(n+2) U ... = ℕ .
Congratulations. You have managed to prove that
for all n [F_n U F_(n+1) U F_(n+2) U ...] = [F_1 U F_2 U F_3 U ... ].

As Alan Smaill pointed out using your own writing, this does not imply that
{for ℕ [ {} = (F_1 U F_2 U F_3 U ... ) ] }.

It's very sad that you are too stupid to understand your own writings and/or too dishonest to admit that you just plagiarized the passage on p.52.
Post by WM
Since this is true for all n, all F_n can be omitted and we find that no FISONs are necessary but
U{ } = ℕ.
This result makes the mathematical reality of the transfinite set ℕ quite doubtful. Therefore it is not acceptable for adherents of transfinite set theory.
But the following accepted definition of being required
F_n is required <==> U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= ℕ
shows that, according to this definition, the set of required FISONs is empty too.
U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= U{F(n+1), F_(n+2), ...}
We do not want to spoil their belief. But students who are not yet closely connected with set theory will perhaps give it some thought whether to get in closer touch with this persuasion.
Regards, WM
j4n bur53
2019-03-03 15:25:20 UTC
Permalink
Can you tell us in a video what you mean?

When will there be the first video, live
from Augsburg Crank institute? Explaining

us Volkswagen Omlette? Maybe a video in
the quality of this, much better than

bird brain John Gabriels videos?

Was ist ein Punkt? (Teil 1)

Post by WM
It is generally accepted that the union of the set of FISONs is
{1} U {1, 2} U {1, 2, 3} U ... = ℕ
or briefly
F_1 U F_2 U F_3 U ... = ℕ.
The first n FISONs can be omitted
F_n U F_(n+1) U F_(n+2) U ... = ℕ .
Since this is true for all n, all F_n can be omitted and we find that no FISONs are necessary but
U{ } = ℕ.
This result makes the mathematical reality of the transfinite set ℕ quite doubtful. Therefore it is not acceptable for adherents of transfinite set theory.
But the following accepted definition of being required
F_n is required <==> U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= ℕ
shows that, according to this definition, the set of required FISONs is empty too.
U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= U{F(n+1), F_(n+2), ...}
We do not want to spoil their belief. But students who are not yet closely connected with set theory will perhaps give it some thought whether to get in closer touch with this persuasion.
Regards, WM
j4n bur53
2019-03-03 15:34:57 UTC
Permalink
Well it would be better, if Prof. Bedürftig
would talk a little faster...
Post by j4n bur53
Can you tell us in a video what you mean?
When will there be the first video, live
from Augsburg Crank institute? Explaining
us Volkswagen Omlette? Maybe a video in
the quality of this, much better than
bird brain John Gabriels videos?
Was ist ein Punkt? (Teil 1)
http://youtu.be/lGtL8Vdw5tM
Post by WM
It is generally accepted that the union of the set of FISONs is
{1} U {1, 2} U {1, 2, 3} U ... = ℕ
or briefly
F_1 U F_2 U F_3 U ... = ℕ.
The first n FISONs can be omitted
F_n U F_(n+1) U F_(n+2) U ... = ℕ .
Since this is true for all n, all F_n can be omitted and we find that no FISONs are necessary but
U{ } = ℕ.
This result makes the mathematical reality of the transfinite set ℕ quite doubtful. Therefore it is not acceptable for adherents of transfinite set theory.
But the following accepted definition of being required
F_n is required <==> U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= ℕ
shows that, according to this definition, the set of required FISONs is empty too.
U{F_1, F_2, ..., F_(n-1), F(n+1), F_(n+2), ...} =/= U{F(n+1), F_(n+2), ...}
We do not want to spoil their belief. But students who are not yet closely connected with set theory will perhaps give it some thought whether to get in closer touch with this persuasion.
Regards, WM
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