Isotypic blocks of finite groups algebras that are not p-permutation equivalent
Abstract
We show that Kessar's isotypy between Galois conjugate blocks of finite group algebras does not always lift to a p-permutation equivalence. We also provide examples of Galois conjugate blocks which are isotypic but not p-permutation equivalent. These results help to clarify the distinction between a p-permutation equivalence and an isotypy, and may be useful in determining necessary and sufficient conditions for when an isotypy lifts to a p-permutation equivalence.
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