Blocks of the Grothendieck ring of equivariant bundles on a finite group (1405.5903v2)

Abstract: If $G$ is a finite group, the Grothendieck group ${\mathbf{K}}_G(G)$ of the category of $G$-equivariant ${\mathbb{C}}$-vector bundles on $G$ (for the action of $G$ on itself by conjugation) is endowed with a structure of (commutative) ring. If $K$ is a sufficiently large extension of ${\mathbb{Q}}_{! p}$ and ${\mathcal{O}}$ denotes the integral closure of ${\mathcal{Z}}_{! p}$ in $K$, the $K$-algebra $K{\mathbf{K}}_G(G)=K \otimes_{\mathbb{Z}} {\mathbf{K}}_G(G)$ is split semisimple. The aim of this paper is to describe the ${\mathcal{O}}$-blocks of the ${\mathcal{O}}$-algebra ${\mathcal{O}} {\mathbf{K}}_G(G)$.