Extensions of Continuous and Lipschitz Functions
Copyright policy )Extensions of Continuous and Lipschitz Functions
AbstractWe show a result slightly more general than the following. Let K be a compact Hausdorff space, F a closed subset of K, and d a lower semi-continuous metric on K. Then each continuous function ƒ on F which is Lipschitz in d admits a continuous extension on K which is Lipschitz in d. The extension has the same supremum norm and the same Lipschitz constant.As a corollary we get that a Banach space X is reflexive if and only if each bounded, weakly continuous and norm Lipschitz function defined on a weakly closed subset of X admits a weakly continuous, norm Lipschitz extension defined on the entire space X.
Duality and reflexivity in normed linear and Banach spaces, extension, Topological spaces with richer structures, reflexive Banach space, Extension of maps
Duality and reflexivity in normed linear and Banach spaces, extension, Topological spaces with richer structures, reflexive Banach space, Extension of maps
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