nLab semicontinuous topology

Redirected from "lower semicontinuous topology".

Semicontinuous topologies

Idea
Definition
References

Idea

The (lower or upper) semicontinuous topology is a topology on the real line (or a generalization thereof) such that a continuous function (from some topological space $X$ ) to the real line equipped with this semicontinuous topology is the same thing as a (lower or upper) semicontinuous map from $X$ to the real line.

Thus one replaces discussion of semicontinuous maps with continuous maps by using a different topological structure.

Definition

Let $R$ be any linear order; think of the real line with its usual order. For each element $a$ of $R$ , consider the subsets

L_a \coloneqq \{ x \in R \;|\; x \gt a \} ,

R_a \coloneqq \{ x \in R \;|\; x \lt a \} .

Definitions

The lower semicontinuous topology on $R$ is generated by the base (of open sets) given by the sets $L_a$ ; the upper semicontinuous topology on $R$ is generated by the base (of open sets) given by the sets $R_a$ .

(more to come)

References

To read later:

Li Yong-ming and Wang Guo-jun, Localic Katětov–Tong insertion theorem and localic Tietze extension theorem, pdf.
Gutiérrez García and Jorge Picado, On the algebraic representation of semicontinuity, doi.

Last revised on June 25, 2019 at 16:07:46. See the history of this page for a list of all contributions to it.