Compactly convex sets in linear topological spaces
Abstract
A convex subset X of a linear topological space is called compactly convex if there is a continuous compact-valued map :X exp(X) such that [x,y]⊂(x) (y) for all x,y∈ X. We prove that each convex subset of the plane is compactly convex. On the other hand, the space R3 contains a convex set that is not compactly convex. Each compactly convex subset X of a linear topological space L has locally compact closure X which is metrizable if and only if each compact subset of X is metrizable.
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