Perverse Equivalences and Broué's Conjecture II: The Cyclic Case

David A. Craven

Published 2012-06-30Version 1

We study Brou\'e's abelian defect group conjecture for groups of Lie type using the recent theory of perverse equivalences and Deligne--Lusztig varieties. Our approach is to analyze the perverse equivalence induced by certain Deligne--Lusztig varieties (the geometric form of Brou\'e's conjecture) directly; this uses the cohomology of these varieties, together with information from the cyclotomic Hecke algebra. We start with a conjecture on the cohomology of these Deligne--Lusztig varieties, prove various desirable properties about it, and then use this to prove the existence of the perverse equivalences predicted by the geometric form of Brou\'e's conjecture whenever the defect group is cyclic (except possibly for two blocks whose Brauer tree is unknown). This is a necessary first step to proving Brou\'e's conjecture in general, as perverse equivalences are built up inductively from various Levi subgroups. This article is the latest in a series by Raphael Rouquier and the author with the eventual aim of proving Brou\'e's conjecture for unipotent blocks of groups of Lie type.