Iterated mutations of symmetric periodic algebras

Abstract

Following methods used by A. Dugas for investigating derived equivalent pairs of (weakly) symmetric algebras, we apply them in a specific situation, obtaining new deep results concerning iterated mutations of symmetric periodic algebras. More specifically, for any symmetric algebra , and an arbitrary vertex i of its Gabriel quiver, one can define mutation μi() of at vertex i via silting mutation of the stalk complex . Then μi() is again symmetric, and we can iterate this process. We want to understand the order of μi, in case the vertex i is d-periodic, i.e. the simple module Si associated to i is periodic of period d (with respect to the syzygy). The main result of this paper shows that then μi has order d-2, that is μid-2() (modulo socle), under some additional assumption on the (periodic) projective-injective resolution of Si. Besides, we present briefly some consequences concerning arbitrary periodic vertex and give few sugestive examples showing that this property should hold in general, i.e. without restrictions on the periodic projective resolution.