Can B(l^p) ever be amenable?

TL;DR

This paper investigates the amenability of operator algebras on elian sequence spaces, establishing new implications and limitations for amenability in various elian and elian-like contexts, especially for elian elian spaces.

Contribution

It provides new conditions linking the amenability of elian operator algebras to their elian subalgebras and constructs specific examples illustrating amenability properties.

Findings

If elian elian operator algebras are amenable, then certain elian elian algebras are also amenable.

elian elian algebras are not amenable for p=1,elian,elian.

Existence of a left ideal with weak properties in ultrapower of compact operators on elian elian spaces.

Abstract

It is known that ${\cal B}(\ell^p)$ is not amenable for $p =1,2,\infty$, but whether or not ${\cal B}(\ell^p)$ is amenable for $p \in (1,\infty) \setminus \{2 \}$ is an open problem. We show that, if ${\cal B}(\ell^p)$ is amenable for $p \in (1,\infty)$, then so are $\ell^\infty({\cal B}(\ell^p))$ and $\ell^\infty({\cal K}(\ell^p))$. Moreover, if $\ell^\infty({\cal K}(\ell^p))$ is amenable so is $\ell^\infty(\mathbb{I},{\cal K}(E))$ for any index set $\mathbb I$ and for any infinite-dimensional ${\cal L}^p$-space $E$; in particular, if $\ell^\infty({\cal K}(\ell^p))$ is amenable for $p \in (1,\infty)$, then so is $\ell^\infty({\cal K}(\ell^p \oplus \ell^2))$. We show that $\ell^\infty({\cal K}(\ell^p \oplus \ell^2))$ is not amenable for $p =1,\infty$, but also that our methods fail us if $p \in (1,\infty)$. Finally, for $p \in (1,2)$ and a free ultrafilter $\cal U$ over $\posints$, we exhibit a closed left ideal of $({\cal K}(\ell^p))_{\cal U}$ lacking a right approximate identity, but enjoying a certain, very weak complementation property.