On Enflo and narrow operators acting on Lp

Abstract

The first part of the paper is inspired by a theorem of H. Rosenthal, that if an operator on L1[0,1] satisfies the assumption that for each measurable set A ⊂eq [0,1] the restriction T |L1(A) is not an isomorphic embedding, then the operator is narrow. (Here L1(A) = \x ∈ L1: \,\, supp \, x ⊂eq A \.) This leads to a natural question of finding mildest possible assumptions for operators on a given space X, which will imply that the operator is narrow. We find a partial answer to this question for operators on Lp(0,1) with 1<p<2. Namely we define a notion of a "gentle" growth of a function and we prove that for 1 < p < 2 every operator T on Lp which is unbounded from below on Lp(A), A ⊂eq [0,1], by means of function having a "gentle" growth, is narrow. In the second part of the paper we consider the question for what Banach spaces X, every operator T:Lp X is narrow. We prove that for 2 < p, r < ∞ every operator T: Lp→r is narrow, which completes the list of results for operators from Lp to sequence and function Lebesgue spaces.