Blocks with defect group D2n x C2m

Abstract

We determine the numerical invariants of blocks with defect group D2n× C2m, where D2n denotes a dihedral group of order 2n and C2m denotes a cyclic group of order 2m. This generalizes Brauer's results for m=0. As a consequence, we prove Brauer's k(B)-conjecture, Olsson's conjecture (and more generally Eaton's conjecture), Brauer's height zero conjecture, the Alperin-McKay conjecture, Alperin's weight conjecture and Robinson's ordinary weight conjecture for these blocks. Moreover, we show that the gluing problem has a unique solution in this case.