Joint spreading models and uniform approximation of bounded operators

Abstract

We investigate the following property for Banach spaces. A Banach space X satisfies the Uniform Approximation on Large Subspaces (UALS) if there exists C>0 with the following property: for any A∈L(X) and convex compact subset W of L(X) for which there exists >0 such that for every x∈ X there exists B∈ W with \|A(x)-B(x)\|\|x\|, there exists a subspace Y of X of finite codimension and a B∈ W with \|(A-B)|Y\|L(Y,X)≤ C. We prove that a class of separable Banach spaces including p, for 1 p< ∞, and C(K), for K countable and compact, satisfy the UALS. On the other hand every Lp[0,1], for 1 p ∞ and p≠2, fails the property and the same holds for C(K), where K is an uncountable metrizable compact space. Our sufficient conditions for UALS are based on joint spreading models, a multidimensional extension of the classical concept of spreading model, introduced and studied in the present paper.