On anti-coproximinal and strongly anti-coproximinal subspaces of function spaces
Abstract
The purpose of this article is to study the anti-coproximinal and strongly anti-coproximinal subspaces of the Banach space of all bounded (continuous) functions. We obtain a tractable necessary condition for a subspace to be stronsgly anti-coproximinal. We prove that for a subspace Y of a Banach space X to be strongly anti-coproximinal, Y must contain all w-ALUR points of X and intersect every maximal face of BX. We also observe that the subspace K(X, Y) of all compact operators between the Banach spaces X and Y is strongly anti-coproximinal in the space L(X, Y) of all bounded linear operators between X and Y, whenever K(X, Y) is a proper subset of L(X, Y), and the unit ball BX is the closed convex hull of its strongly exposed points.
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