Norm attaining operators and variational principle
Abstract
We establish a linear variational principle extending the Deville-Godefroy-Zizler's one. We use this variational principle to prove that if X is a Banach space having property (α) of Schachermayer and Y is any banach space, then the set of all norm strongly attaining linear operators from X into Y is a complement of a σ-porous set. Moreover, the results of the paper applies also to an abstract class of (linear and nonlinear) operator spaces.
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