On a question of Rickard on tensor product of stably equivalent algebras

Abstract

Let \p be the algebraic closure of the prime field of characteristic p. After observing that the principal block B of \pPSU(3,pr) is stably equivalent of Morita type to its Brauer correspondent b, we show however that the centre of B is not isomorphic as an algebra to the centre of b in the cases pr∈\3,4,5,8\. As a consequence, the algebra B\\p \p[X]/Xp is not stably equivalent of Morita type to b\\p\p[X]/Xp in these cases. This yields a negative answer to a question of Rickard.