現代数学の系譜　カントル　超限集合論2

[過去ﾛｸﾞ] 現代数学の系譜　カントル　超限集合論2 (1002ﾚｽ)
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63: １３２人目の素数さん [sage] 2019/12/25(水) 12:08:40.77 ID:xYwdBxRF

>>58
>では位相空間はなにに設定するのですか？
>近傍族はなんですか？

ほいよ（＾＾
（>>35より再録）
https://ja.wikipedia.org/wiki/%E6%A5%B5%E9%99%90%E9%A0%86%E5%BA%8F%E6%95%B0
極限順序数
(抜粋)
特徴付け
極限順序数は他にもいろいろなやり方で定義できる:
・順序数全体の成す類において順序位相（英語版）に関する極限点 (ほかの順序数は孤立点となる)。
(引用終り)

"順序位相（英語版）"
より、下記
まあ、確かに、 (a,∞)とか”∞”が定義されていないと、
循環論法になるけど、
”∞”が先に別の仕方で定義されていれば、これで良いだろ

https://en.wikipedia.org/wiki/Order_topology
Order topology
(抜粋)
In mathematics, an order topology is a certain topology that can be defined on any totally ordered set. It is a natural generalization of the topology of the real numbers to arbitrary totally ordered sets.
If X is a totally ordered set, the order topology on X is generated by the subbase of "open rays"
(a,∞)={x ｜ a<x}}
(-∞,b)={x ｜ x<b}}(
for all a, b in X. Provided X has at least two elements, this is equivalent to saying that the open intervals
(a,b)={x ｜ a<x<b}}
together with the above rays form a base for the order topology. The open sets in X are the sets that are a union of (possibly infinitely many) such open intervals and rays.
A topological space X is called orderable if there exists a total order on its elements such that the order topology induced by that order and the given topology on X coincide. The order topology makes X into a completely normal Hausdorff space.
The standard topologies on R, Q, Z, and N are the order topologies.

Contents
1 Induced order topology
2 An example of a subspace of a linearly ordered space whose topology is not an order topology
3 Left and right order topologies
4 Ordinal space
5 Topology and ordinals
5.1 Ordinals as topological spaces

http://rio2016.5ch.net/test/read.cgi/math/1576852086/63

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