Dieudonn\'e completeness of function spaces
Abstract
A space is called Dieudonn\'e complete if it is complete relative to the maximal uniform structure compatible with its topology. In this paper, we investigated when the function space C(X,Y) of all continuous functions from a topological space X into a uniform space Y with the topology of uniform convergence on a family of subsets of X is Dieudonn\'e complete. Also we proved a generalization of the Eberlein-Smulian theorem to the class of Banach spaces.
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