English

(Non-)amenability of B(E)

Functional Analysis 2011-03-22 v4 History and Overview

Abstract

In 1972, the late B. E. Johnson introduced the notion of an amenable Banach algebra and asked whether the Banach algebra B(E)B(E) of all bounded linear operators on a Banach space EE could ever be amenable if dimE=\dim E = \infty. Somewhat surprisingly, this question was answered positively only very recently as a by-product of the Argyros--Haydon result that solves the "scalar plus compact problem": there is an infinite-dimensional Banach space EE, the dual of which is 1\ell^1, such that B(E)=K(E)+C\idEB(E) = K(E)+ \mathbb{C} \id_E. Still, B(2)B(\ell^2) is not amenable, and in the past decade, B(p) B(\ell^p) was found to be non-amenable for p=1,2,p=1,2,\infty thanks to the work of C. J. Read, G. Pisier, and N. Ozawa. We survey those results, and then--based on joint work with M. Daws--outline a proof that establishes the non-amenability of B(p)B(\ell^p) for all p[1,]p \in [1,\infty].

Keywords

Cite

@article{arxiv.0909.2628,
  title  = {(Non-)amenability of B(E)},
  author = {Volker Runde},
  journal= {arXiv preprint arXiv:0909.2628},
  year   = {2011}
}

Comments

16 pages; a survey article - more typos fixed

R2 v1 2026-06-21T13:46:18.740Z