nLab closed intervals are compact topological spaces

Context

Topology

topology (point-set topology, point-free topology)

see also differential topology, algebraic topology, functional analysis and topological homotopy theory

Introduction

Basic concepts

Universal constructions

Extra stuff, structure, properties

Examples

Basic statements

Theorems

Analysis Theorems

topological homotopy theory

Theorem

For any a<ba \lt b \in \mathbb{R} the closed interval

[a,b] [a,b] \subset \mathbb{R}

regarded with its subspace topology of Euclidean space with its metric topology is a compact topological space.

Proof

Since all the closed intervals are homeomorphic it is sufficient to show the statement for [0,1][0,1]. Hence let {U i[0,1]} iI\{U_i \subset [0,1]\}_{i \in I} be an open cover. We need to show that it has an open subcover.

Say that an element x[0,1]x \in [0,1] is admissible if the closed sub-interval [0,x][0,x] is covered by finitely many of the U iU_i. In this terminology, what we need to show is that 11 is admissible.

Observe from the definition that

  1. 0 is admissible,

  2. if y<x[0,1]y \lt x \in [0,1] and xx is admissible, then also yy is admissible.

This means that the set of admissible xx forms either

  1. an open interval [0,g)[0,g)

  2. or a closed interval [0,g][0,g],

for some g[0,1]g \in [0,1]. We need to show that the latter is true, and for g=1g = 1. We do so by observing that the alternatives lead to contradictions:

  1. Assume that the set of admissible values were an open interval [0,g)[0,g). Pick an i 0Ii_0 \in I such that gU i 0g \in U_{i_0} (this exists because of the covering property). Since such U i 0U_{i_0} is an open neighbourhood of gg, there is a positive real number ϵ\epsilon such that the open ball B g (ϵ)U i 0B^\circ_g(\epsilon) \subset U_{i_0} is still contained in the patch. It follows that there is an element xB g (ϵ)[0,g)U i 0[0,g)x \in B^\circ_g(\epsilon) \cap [0,g) \subset U_{i_0} \cap [0,g) and such that there is a finite subset JIJ \subset I with {U i[0,1]} iJI\{U_i \subset [0,1]\}_{i \in J \subset I} a finite open cover of [0,x)[0,x). It follows that {U i[0,1]} iJI{U i 0}\{U_i \subset [0,1]\}_{i \in J \subset I} \sqcup \{U_{i_0}\} were a finite open cover of [0,g][0,g], hence that gg itself were still admissible, in contradiction to the assumption.

  2. Assume that the set of admissible values were a closed interval [0,g][0,g] for g<1g \lt 1. By assumption there would then be a finite set JIJ \subset I such that {U i[0,1]} iJI\{U_i \subset [0,1]\}_{i \in J \subset I} were a finite cover of [0,g][0,g]. Hence there would be an index i gJi_g \in J such that gU i gg \in U_{i_g}. But then by the nature of open subsets in the Euclidean space \mathbb{R}, this U i gU_{i_g} would also contain an open ball B g (ϵ)=(gϵ,g+ϵ)B^\circ_g(\epsilon) = (g-\epsilon, g + \epsilon). This would mean that the set of admissible values includes the open interval [0,g+ϵ)[0,g+ \epsilon), contradicting the assumption.

This gives a proof by contradiction.

Last revised on June 6, 2017 at 08:20:03. See the history of this page for a list of all contributions to it.