Weak amenability of commutative Beurling algebras

TL;DR

This paper characterizes when commutative Beurling algebras on locally compact Abelian groups are weakly amenable, linking this property to the absence of certain group homomorphisms and providing conditions for 2-weak amenability.

Contribution

It establishes necessary and sufficient conditions for weak amenability and 2-weak amenability of Beurling algebras on Abelian groups, extending previous understanding.

Findings

Weak amenability characterized by absence of specific group homomorphisms.

Conditions for 2-weak amenability involving growth limits of weights.

Provides a complete criterion for weak amenability in this setting.

Abstract

For a locally compact Abelian group $G$ and a continuous weight function $\omega$ on $G$ we show that the Beurling algebra $L^1(G, \omega)$ is weakly amenable if and only if there is no nontrivial continuous group homomorphism $\phi$: $G\to \mathbb{C}$ such that $\sup_{t\in G}\frac{|\phi(t)|}{\omega(t)\omega(t^{-1})} < \infty$. Let $\hat\omega(t) = \limsup_{s\to \infty}\omega(ts)/\omega(s)$ ($t\in G$). Then $L^1(G, \omega)$ is 2-weakly amenable if there is a constant $m> 0$ such that $\liminf_{n\to \infty}\frac{\omega(t^n)\hat\omega(t^{-n})}{n} \leq m$ for all $t\in G$.