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852(3): 現代数学の系譜 雑談 ◆yH25M02vWFhP [] 2025/07/10(木) 07:08:02.22 ID:J4CWtGen(1/3) AAS
>>848-851
ふっふ、ほっほ
もう詰んだのか?w ;p)
>>727より再録
>”∩{x⊂A|{}∈x∧∀y[y∈x→y∪{y}∈x]}”
この式は、下記(ja.ipedia)のペアノの公理 自然数の集合論的構成 の式だが
上記の通り、∩のIterated binary operation の意味が不明確(この説明を求められると詰まるだろう)
なので、∩を使わない 別の工夫がある(下記)
例えば en.wikipedia Axiom of infinity, Extracting the natural numbers from the infinite set, Alternative method
あるいは fr.wikipedia Axiome de l'infini
あるいは、>>569 筑波大 坪井明人 PDF P9 https://www.math.tsukuba.ac.jp/~tsuboi/und/14logic3.pdf 数理論理学II
あるいは、>>677 渕野昌 P10(無限公理)https://fuchino.ddo.jp/books/intro-to-set-theory-and-constructibility.pdf 「ゲーデルと20世紀の論理学第4巻」(東京大学出版会,2007)の,渕野 昌の執筆した第I部
以上
(引用終り)
繰り返すが、∩のIterated binary operation の意味が不明確
さらに、wikipedia Axiom of infinity 記述を引用する >>630-631 より
https://en.wikipedia.org/wiki/Axiom_of_infinity
Axiom of infinity
Extracting the natural numbers from the infinite set
The infinite set I is a superset of the natural numbers. To show that the natural numbers themselves constitute a set, the axiom schema of specification can be applied to remove unwanted elements, leaving the set N of all natural numbers. This set is unique by the axiom of extensionality.
To extract the natural numbers, we need a definition of which sets are natural numbers. The natural numbers can be defined in a way that does not assume any axioms except the axiom of extensionality and the axiom of induction—a natural number is either zero or a successor and each of its elements is either zero or a successor of another of its elements. In formal language, the definition says:
∀n(n∈N⟺([n=∅∨∃k(n=k∪{k})]∧∀m∈n[m=∅∨∃k∈n(m=k∪{k})])).
Or, even more formally:
∀n(n∈N⟺([∀k(¬k∈n)∨∃k∀j(j∈n⟺(j∈k∨j=k))]∧
∀m(m∈n⇒[∀k(¬k∈m)∨∃k(k∈n∧∀j(j∈m⟺(j∈k∨j=k)))]))).
つづく
854: 132人目の素数さん [] 2025/07/10(木) 07:12:32.45 ID:e06yId8e(4/18) AAS
>>852
>∩のIterated binary operation の意味が不明確
まだ言ってて草
>(この説明を求められると詰まるだろう)
だから
>一般の集合族の共通部分の定義 (x∈∩M)⇔(∀A∈M, x∈A)
と何度言わせるんだ? 言葉が分からないのか? なら小学校の国語からやり直し
867(4): 現代数学の系譜 雑談 ◆yH25M02vWFhP [] 2025/07/10(木) 10:20:18.09 ID:CJHicHXJ(1) AAS
>>854-866
ふっふ、ほっほ
ぐだぐだ 無駄な多弁を弄するね ;p)
さて
>>852-853より
https://en.wikipedia.org/wiki/Axiom_of_infinity
Axiom of infinity
Extracting the natural numbers from the infinite set
Φ(x) be the formula that says "x is inductive"; i.e.
Φ(x)=(∅∈x∧∀y(y∈x→(y∪{y}∈x))).
Informally, what we will do is take the intersection of all inductive sets. More formally, we wish to prove the existence of a unique set W such that
∀x(x∈W↔∀I(Φ(I)→x∈I)). (*)
For existence, we will use the Axiom of Infinity combined with the Axiom schema of specification.
Let I be an inductive set guaranteed by the Axiom of Infinity. Then we use the axiom schema of specification to define our set
W={x∈I:∀J(Φ(J)→x∈J)}
– i.e. W is the set of all elements of I, which also happen to be elements of every other inductive set. This clearly satisfies the hypothesis of (*), since if x∈W, then
x is in every inductive set, and if
x is in every inductive set, it is in particular in I, so it must also be in W.
For uniqueness, first note that any set that satisfies (*) is itself inductive, since 0 is in all inductive sets, and if an element
x is in all inductive sets, then by the inductive property so is its successor. Thus if there were another set
W′ that satisfied (*) we would have that
W′⊆W since
W is inductive, and
W⊆W′since
W′is inductive. Thus W=W′.
Let ω denote this unique element.
This definition is convenient because the principle of induction immediately follows: If
I⊆ω is inductive, then also
ω⊆I, so that I=ω.■
(引用終り)
これで尽きている
1)”Informally, what we will do is take the intersection of all inductive sets.”
intersection:共通部分 英: intersection(下記)ね
2)で、これ ”Informally”とあるよね。つまり、
”∩{x⊂A|{}∈x∧∀y[y∈x→y∪{y}∈x]}”>>727 は、”Informally”なんだよ
ここを勘違いした人が ja.wikipediaに >>847の”ペアノの公理”を 書いたんじゃないの?
3)さて、Formallyには ”Let I be an inductive set guaranteed by the Axiom of Infinity. Then we use the axiom schema of specification to define our set
W={x∈I:∀J(Φ(J)→x∈J)}
– i.e. W is the set of all elements of I, which also happen to be elements of every other inductive set.”
だよね。ここに、”∩”は 使われない
詰んだな
(参考)
https://ja.wikipedia.org/wiki/%E5%85%B1%E9%80%9A%E9%83%A8%E5%88%86_(%E6%95%B0%E5%AD%A6)
共通部分( 英: intersection, meet)とは、与えられた集合の集まり(族)全てに共通に含まれる元を全て含み、それ以外の元は含まない集合のことである
920(4): 現代数学の系譜 雑談 ◆yH25M02vWFhP [] 2025/07/19(土) 15:34:03.80 ID:jT6bEcWg(2/5) AAS
>>874 戻る
>Informally と intersection が同一文内にある。だから∩を使った構成は間違い。
えーと >>867 より再録
>>852-853より
https://en.wikipedia.org/wiki/Axiom_of_infinity
Axiom of infinity
Extracting the natural numbers from the infinite set
Φ(x) be the formula that says "x is inductive"; i.e.
Φ(x)=(∅∈x∧∀y(y∈x→(y∪{y}∈x))).
Informally, what we will do is take the intersection of all inductive sets. More formally, we wish to prove the existence of a unique set W such that
∀x(x∈W↔∀I(Φ(I)→x∈I)). (*)
For existence, we will use the Axiom of Infinity combined with the Axiom schema of specification.
Let I be an inductive set guaranteed by the Axiom of Infinity. Then we use the axiom schema of specification to define our set
W={x∈I:∀J(Φ(J)→x∈J)}
– i.e. W is the set of all elements of I, which also happen to be elements of every other inductive set. This clearly satisfies the hypothesis of (*), since if x∈W, then
x is in every inductive set, and if
x is in every inductive set, it is in particular in I, so it must also be in W.
For uniqueness, first note that any set that satisfies (*) is itself inductive, since 0 is in all inductive sets, and if an element
x is in all inductive sets, then by the inductive property so is its successor. Thus if there were another set
W′ that satisfied (*) we would have that
W′⊆W since
W is inductive, and
W⊆W′since
W′is inductive. Thus W=W′.
Let ω denote this unique element.
This definition is convenient because the principle of induction immediately follows: If
I⊆ω is inductive, then also
ω⊆I, so that I=ω.■
(引用終り)
1)”Informally, what we will do is take the intersection of all inductive sets.”
intersection:共通部分 英: intersection(下記)ね
2)で、これ ”Informally”とあるよね。つまり、
”∩{x⊂A|{}∈x∧∀y[y∈x→y∪{y}∈x]}”>>727 は、”Informally”なんだよ
ここを勘違いした人が ja.wikipediaに >>847の”ペアノの公理”を 書いたんじゃないの?
3)さて、Formallyには ”Let I be an inductive set guaranteed by the Axiom of Infinity. Then we use the axiom schema of specification to define our set
W={x∈I:∀J(Φ(J)→x∈J)}
– i.e. W is the set of all elements of I, which also happen to be elements of every other inductive set.”
だよね。ここに、”∩”は 使われない
(引用終り)
つづく
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