Multiplication operators on L(Lp) and p-strictly singular operators

Abstract

A classification of weakly compact multiplication operators on L(Lp), 1<p<∞, is given. This answers a question raised by Saksman and Tylli in 1992. The classification involves the concept of p-strictly singular operators, and we also investigate the structure of general p-strictly singular operators on Lp. The main result is that if an operator T on Lp, 1<p<2, is p-strictly singular and T|X is an isomorphism for some subspace X of Lp, then X embeds into Lr for all r<2, but X need not be isomorphic to a Hilbert space. It is also shown that if T is convolution by a biased coin on Lp of the Cantor group, 1 p <2, and T|X is an isomorphism for some reflexive subspace X of Lp, then X is isomorphic to a Hilbert space. The case p=1 answers a question asked by Rosenthal in 1976.