Lipschitz extensions of linear operators
Abstract
Let E, F, E0 be Banach spaces, with E0 a subspace of E. For a maximal Banach operator ideal A, we show that a linear operator from E0 to F can be extended to a linear operator from E to F that belongs to A if and only if it can be extended to a Lipschitz map from E to F belonging to a wide class of Lipschitz Banach operator ideals related with A. As a consequence, we show that linear operators with special Lipschitz factorization through ∞() has analogous linear factorization through ∞().
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