Bernhard Böhmler, Karin Erdmann, Viktoria Klasz, Rene Marczinzik
Published 2023-10-19Version 1
Let $KG$ be a group algebra with $G$ a finite group and $K$ a field and $M$ an indecomposable $KG$-module. We pose the question, whether $Ext_{KG}^1(M,M) \neq 0$ implies that $Ext_{KG}^i(M,M) \neq 0$ for all $i \geq 1$. We give a positive answer in several important special cases such as for periodic groups and give a positive answer also for all Nakayama algebras, which allows us to improve a classical result of Gustafson. We then specialise the question to the case where the module $M$ is simple, where we obtain a positive answer also for all tame blocks of group algebras. For simple modules $M$, the appendix provides a Magma program that gives strong evidence for a positive answer to this question for groups of small order.
$τ$-Tilting finiteness of group algebras over generalized symmetric groups
$τ$-Tilting finiteness of group algebras of semidirect products of abelian $p$-groups and abelian $p'$-groups
Ghost numbers of group algebras II
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