On strictly singular operators between separable Banach spaces

Abstract

Let X and Y be separable Banach spaces and denote by (X,Y) the subset of (X,Y) consisting of all strictly singular operators. We study various ordinal ranks on the set (X,Y). Our main results are summarized as follows. Firstly, we define a new rank on (X,Y). We show that is a co-analytic rank and that dominates the rank introduced by Androulakis, Dodos, Sirotkin and Troitsky [Israel J. Math., 169 (2009), 221-250]. Secondly, for every 1≤ p<+∞ we construct a Banach space Yp with an unconditional basis such that (p, Yp) is a co-analytic non-Borel subset of (p,Yp) yet every strictly singular operator T:p Yp satisfies (T)≤ 2. This answers a question of Argyros.