Linear structures in the set of non-norm-attaining operators on Banach spaces
Abstract
We study large linear structures inside sets arising in the theory of norm-attaining operators. We provide several results in the context of lineability, spaceability, maximal-spaceability, and (α, β)-spaceability for sets of non-norm-attaining bounded linear operators whenever such sets are nonempty. To be more specific, we show that if Y is a strictly convex renorming of c0 (), then the set L(c0 (),Y) NA (c0 (),Y) is 2||-spaceable. We also prove that L(d* (w,1) ,p ) NA (d* (w,1),p ) is maximal-spaceable. Finally, we establish that whenever the set of non-norm-attaining operators from a Banach space X into p () (respectively, c0 ()) is nonempty, it contains a subspace linearly isometric to p() (respectively, c0 ()). These results extend and complement several known results in the literature concerning large linear structures in sets of non-norm-attaining operators. Our results are obtained in a more general framework involving group-invariant operators, which allows us to treat classical spaces of operators as special cases.
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