On subspaces of c0 and extension of operators into C(K)-spaces

Abstract

Johnson and Zippin recently showed that if X is a weak*-closed subspace of 1 and T:X-> C(K) is any bounded operator then T can extended to a bounded operator T:1 C(K). We give a converse result: if X is a subspace of 1 so that 1/X has a (UFDD) and every operator T:X -> C(K) can be extended to 1 then there is an automorphism τ of 1 so that τ(X) is weak*-closed. This result is proved by studying subspaces of c0 and several different characterizations of such subspaces are given.

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