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Abstract
Let r be a positive integer, let p be a prime, and denote an algebraic closure of the prime field
. After observing that the principal block B of
is stably equivalent of Morita type to its Brauer correspondent b, we compute the radical series of the center Z(b), and, using GAP, the radical series of Z(B) in the cases pr ∈ {3, 4, 5, 7, 8}. In these cases, the dimensions of the last nonzero power of the radical of Z(b) and Z(B) are different, and it follows that the algebra
is not stably equivalent of Morita type to
. This yields a negative answer to a question of Rickard.
2000 AMS Subject Classification:
Acknowledgment
The idea of this article was born during a visit of both authors in Beijing Normal University. We are very grateful to Yuming Liu for his great hospitality. Moreover, we thank Yuming Liu for suggesting a question to us leading to the present article, and also for pointing out that it is not sufficient to show an abstract nonisomorphism of the centers of the blocks. This led us to complete our proof by adding Lemma 9.
Funding
Both authors were supported by a grant STIC Asie ’Escap’ from the Ministère des Affaires Étrangères de la France.