Spans and convex combinations of boundary-valued continuous functions
Abstract
For an (n 2)-dimensional real Banach space E with unit ball E 1 and a topological space X arbitrary elements in C(X,E 1) are always expressible as linear combinations of at most three functions valued in the unit sphere ∂ E 1. On the other hand, for normal X, C(X,E 1) can only be the convex hull of C(X,∂ E 1) if the covering dimension of X is strictly smaller than E. A variant of this remark is the characterization of normal X with X< E as precisely those for which C(X,E 1) is the convex hull of nowhere-vanishing continuous X E 1 or, equivalently, that of continuous functions X E[r,1], r∈ (0,1) valued in arbitrarily thin spherical shells. This extends a number of results due to Peck, Cantwell, Bogachev, Mena-Jurado, Navarro-Pascual and Jim\'enez-Vargas and others revolving around the realizability of the unit ball of C(X,E) as a convex hull of its extreme points for strictly convex and/or complex E.
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