convex hull of $S$ is open if $S$ is open

Theorem If $S$ is an open set in a topological vector space, then the convex hull $\operatorname{co}(S)$ is open.

As the next example shows, the corresponding result does not hold for a closed set.

Example (Valentine, p. 14) If

S=\{(x,1/|x|)\in\mathbbmss{R}^{2}\mid x\in\mathbbmss{R}\setminus\{0\}\},

then $S$ is closed, but $\operatorname{co}(S)$ is the open half-space $\{(x,y)\mid x\in\mathbbmss{R},y\in(0,\infty)\}$ , which is not closed (points on the $x$ -axis are accumulation points not in the set, or also can be seen by checking the complement is not open). $\Box$

Reference
F.A. Valentine, Convex sets, McGraw-Hill book company, 1964.

Title	convex hull of $S$ is open if $S$ is open
Canonical name	ConvexHullOfSIsOpenIfSIsOpen
Date of creation	2013-03-22 13:44:47
Last modified on	2013-03-22 13:44:47
Owner	drini (3)
Last modified by	drini (3)
Numerical id	9
Author	drini (3)
Entry type	Theorem
Classification	msc 47L07
Classification	msc 46A55

convex hull of S is open if S is open

convex hull of $S$ is open if $S$ is open