Perfect Isometries for Blocks with Abelian Defect Groups and Dihedral Inertial Quotients of Order 6

Let b be the principal p-block of a finite group G with an abelian defect group Ž . Ž Ž . Ž .. P and e a root of b in C P . If the inertial quotient E s N P, e rPиC P is G G G Ž . an elementary abelian 2-group respectively, a dihedral group of order 8 and Ž . p / 3, then b and its Brauer correspond

Let b be a p-block of a finite group G with abelian defect group P and e a root Ž . Ž Ž . Ž .. of b in C P . If the inertial quotient E s N P, e rPиC P is isomorphic to G G G Z = = = = = Z and p P 7, then there is a perfect isometry from the group of generalized 4 2 characters of some twisted group

Let b be a p-block of a finite group G with abelian defect group P and e a root Ž . , then there is a perfect isometry from the group of general-3 3 ized characters of some twisted group algebra of the semidirect product of E and P onto the group of generalized characters of G in b, and, furthermor