Coherence conditions for the characters of trivial source modules and strong isotypies
Abstract
We introduce a new type of equivalence between blocks of finite group algebras called a strong isotypy. A strong isotypy is equivalent to a p-permutation equivalence and restricts to an isotypy in the sense of Brou\'e. To prove these results we first establish that the group TO(B) of trivial source B-modules, where B is a block of a finite group algebra, is isomorphic to groups of ``coherent character tuples.'' This provides a refinement of work by Boltje and Carman which characterizes the ring TO(G) of trivial source OG-modules, where G is a finite group, in terms of coherent character tuples.
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