Morita Equivalence for Blocks of Hecke Algebras of Type B

In [8], Scopes verified the Donovan conjecture for blocks of the finite symmetric groups. Her main theorem ( 1.3 below) was proved by finding a sufficient condition for Morita equivalence between two blocks of the same weight. Since there is a close connection between representations of the symmetri

## Abstract In this paper we study the branching problems for the Hecke algebra ℋ︁(__D__ ~__n__~ ) of type __D__ ~__n__~ . We explicitly describe the decompositions into irreducible modules of the socle of the restriction of each irreducible ℋ︁(__D__ ~__n__~ )‐representation to ℋ︁(__D__ ~__n__ –1~)

We compute the ⌽ -modular decomposition matrices for the generic e Ž . Iwahori᎐Hecke algebras of type I m for m g ‫,ގ‬ m ) 2, H , and H , for all 2 3 4 e g ‫ގ‬ leading to nontrivial decomposition maps. The results are obtained by a combined use of different ideas from computational representation th

Given a C\*-dynamical system (A, G, :), we discuss conditions under which subalgebras of the multiplier algebra M(A) consisting of fixed points for : are Morita Rieffel equivalent to ideals in the crossed product of A by G. In case G is abelian we also develop a spectral theory, giving a necessary a