Narrow and 2-strictly singular operators from Lp

Abstract

In the first part of the paper we prove that for 2 < p, r < ∞ every operator T: Lp r is narrow. This completes the list of sequence and function Lebesgue spaces X with the property that every operator T:Lp X is narrow. Next, using similar methods we prove that every 2-strictly singular operator from Lp, 1<p<∞, to any Banach space with an unconditional basis, is narrow, which partially answers a question of Plichko and Popov posed in 1990. A theorem of H. P. Rosenthal asserts that if an operator T 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 T is narrow. (Here L1(A) = \x ∈ L1: supp \, x ⊂eq A\.) Inspired by this result, in the last part of the paper, we find a sufficient condition, of a different flavor than being 2-strictly singular, for operators on Lp[0,1], 1<p<2, to be narrow. 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, for every A⊂eq[0,1], sends a function of "gentle" growth supported on A to a function of arbitrarily small norm is narrow.