τ-Tilting finiteness of group algebras over generalized symmetric groups

Abstract

In this paper, we show that weakly symmetric τ-tilting finite algebras have positive definite Cartan matrices, which implies that we can prove τ-tilting infiniteness of weakly symmetric algebras by calculating their Cartan matrices. Similarly, we obtain the condition on Cartan matrices that selfinjective algebras are τ-tilting infinite. By applying this result, we show that a group algebra of (Z/plZ)n H is τ-tilting infinite when pl≥ n and \#IBr\,H≥\p,3\, where p>0 is the characteristic of the ground field, H is a subgroup of the symmetric group Sn of degree n, the action of H permutes the entries of (Z/plZ)n, and IBr\,H denotes the set of irreducible p-Brauer characters of H. Moreover, we show that under the assumption that pl≥ n and H is a p'-subgroup of Sn, τ-tilting finiteness of a group algebra of a group (Z/plZ)n H is determined by its p-hyperfocal subgroup.

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