On Lindenstrauss-Peczy\'nski spaces
Abstract
In this work we shall be concerned with some stability aspects of the classical problem of extension of C(K)-valued operators. We introduce the class LP of Banach spaces of Lindenstrauss-Peczy\'nski type as those such that every operator from a subspace of c0 into them can be extended to c0. We show that all LP-spaces are of type L∞ but not the converse. Moreover, L∞-spaces will be characterized as those spaces E such that E-valued operators from w*(l1,c0)-closed subspaces of l1 extend to l1. Complemented subspaces of C(K) and separably injective spaces are subclasses of LP-spaces and we show that the former does not contain the latter. It is established that L∞-spaces not containing l1 are quotients of LP-spaces, while L∞-spaces not containing c0, quotients of an LP-space by a separably injective space and twisted sums of LP-spaces are LP-spaces.
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