Beurling-Fourier algebras on compact groups: spectral theory
arXiv:1103.4063
Abstract
For a compact group $G$ we define the Beurling-Fourier algebra $A_Ï(G)$ on $G$ for weights $Ï$ defined on the dual $\what G$ and taking positive values. The classical Fourier algebra corresponds to the case $Ï$ is the constant weight 1. We study the Gelfand spectrum of the algebra realizing it as a subset of the complexification $G_{\mathbb C}$ defined by McKennon and Cartwright and McMullen. In many cases, such as for polynomial weights, the spectrum is simply $G$. We discuss the questions when the algebra $A_Ï(G)$ is symmetric and regular. We also obtain various results concerning spectral synthesis for $A_Ï(G)$.
37 pages