ガロア第一論文と乗数イデアル他関連資料スレ18

ガロア第一論文と乗数イデアル他関連資料スレ18 (484ﾚｽ)
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164: 現代数学の系譜雑談 ◆yH25M02vWFhP 06/12(木)21:28 ID:EWvjXceg(1/3) AAS
>>163
ID:rJG0m4Qlは、御大か
巡回ありがとうございます

>>162
死狂幻調教大師S.A.D.@月と六ベンツさん
いつもありがとうございます

165(4): 現代数学の系譜雑談 ◆yH25M02vWFhP 06/12(木)22:33 ID:EWvjXceg(2/3) AAS
>>155
>2)は、必要条件を求める問題、もちろん有界閉区間での知見を「陽」に使ってよい
>っていうか「陽」につかわないって馬鹿？

ふっふ、ほっほ
下記のAI による概要で
”Theorem:
Let X and Y be metric spaces, S a subset of X, and f: S -> Y.
If f is uniformly continuous and Y is complete, then there exists a unique continuous extension of f to ¯S (the closure of S).
Furthermore, this extension is uniformly continuous.”と言ってますよ
”有界閉区間”の条件はありません！！ｗ；ｐ）
省21

166(3): 現代数学の系譜雑談 ◆yH25M02vWFhP 06/12(木)22:34 ID:EWvjXceg(3/3) AAS
つづき

Proof Outline:
1. Definition of Extension:
The extension F is defined on X by considering a sequence {x_n} in S that converges to x in X. Then F(x) is defined as the limit of f(x_n) as n approaches infinity.
2. Well-Definedness:
The definition of F is shown to be independent of the chosen sequence {x_n} converging to x.
3. Continuity of Extension:
The extension F is shown to be continuous on the closure of S (i.e., ¯S).
4. Uniform Continuity of Extension:
The uniform continuity of F is established using the uniform continuity of f and the completeness of Y.
省14

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