(Non-)amenability of B(E) and Banach space geometry

Abstract

Let E be a Banach space, and B(E) the algebra of all bounded linear operators on E. The question of amenability of B(E) goes back to Johnson's seminal memoir johnson from 1972. We present the first general criteria applying to very wide classes of Banach spaces, given in terms of the Banach space geometry of E, which imply that B(E) is non-amenable. We cover all spaces for which this is known so far (with the exception of one particular example), with much shorter proofs, such as p for p ∈ [1, ∞] and c0, but also many new spaces: the numerous classes of spaces covered range from all Lp-spaces for p ∈ (1, ∞) to Lorentz sequence spaces and reflexive Orlicz sequence spaces, to the Schatten classes Sp for p ∈ [1,∞], and to the James space J, the Schlumprecht space S, and the Tsirelson space T, among others. Our approach also highlights the geometric difference to the only space for which B(E) is known to be amenable, the Argyros--Haydon space, which solved the famous scalar-plus-compact problem.