B(lp) is never amenable

Abstract

We show that, if E is a Banach space with a basis satisfying a certain condition, then the Banach algebra ∞( K(2 E)) is not amenable; in particular, this is true for E = p with p ∈ (1,∞). As a consequence, ∞( K(E)) is not amenable for any infinite-dimensional Lp-space. This, in turn, entails the non-amenability of B(p(E)) for any Lp-space E, so that, in particular, B(p) and B(Lp[0,1]) are not amenable.