Unipotent -blocks for simply-connected p-adic groups

Abstract

Let F be a non-archimedean local field and G the F-points of a connected simply-connected reductive group over F. In this paper, we study the unipotent -blocks of G, for ≠ p. To that end, we introduce the notion of (d,1)-series for finite reductive groups. These series form a partition of the irreducible representations and are defined using Harish-Chandra theory and d-Harish-Chandra theory. The -blocks are then constructed using these (d,1)-series, with d the order of q modulo , and consistent systems of idempotents on the Bruhat-Tits building of G. We also describe the stable -block decomposition of the depth zero category of an unramified classical group.