Modules with finitely generated cohomology

Abstract

Let G be a finite group and k a field of characteristic p. It is conjectured in a paper of the first author and John Greenlees that the thick subcategory of the stable module category StMod(kG) consisting of modules whose cohomology is finitely generated over H*(G,k) is generated by finite dimensional modules and modules with no cohomology. If the centraliser of every element of order p in G is p-nilpotent, this statement follows from previous work. Our purpose here is to prove this conjecture in two cases with non p-nilpotent centralisers. The groups involved are Z/3r×3 (r> 0) in characteristic three and Z/2× A4 in characteristic two. As a consequence, in these cases the bounded derived category of C*BG (cochains on BG with coefficients in k) is generated by C*BS, where S is a Sylow p-subgroup of G.