Functorial equivalence classes of 2-blocks of tame representation type

Abstract

For any block of a finite group over an algebraically closed field of characteristic 2 which has dihedral, semidihedral, or generalized quaternion defect groups, we determine explicitly the decomposition of the associated diagonal p-permutation functor over an algebraically closed field F of characteristic 0 into a direct sum of simple functors. As a consequence we see that two blocks with dihedral, semidihedral, or generalized quaternion defect groups are functorially equivalent over F if and only if their fusion systems are isomorphic. It is an open question if two blocks (with arbitrary defect groups) that are functorially equivalent over F must have isomorphic fusion systems. The converse is wrong in general.