Galois Coverings, τ-Rigidity and Mutations
Abstract
For an algebraically closed field K, we consider a Galois G-covering B A between locally bounded K-categories given by bound quivers, where G is torsion-free and acts freely on the objects of B. We define the notion of (G,τB)-rigid subcategory and of support (G,τB)-tilting pairs over B- mod. These are the analogues of the similar concepts in the context of a finite-dimensional algebra, where we additionally require that the subcategory be G-equivariant. When A is a finite-dimensional algebra, we show that the corresponding push-down functor Fλ: B- mod A- mod sends (G,τB)-rigid subcategories (respectively support (G,τB)-tilting pairs) to τA-rigid modules (respectively support τA-tilting pairs). We further show that there is a notion of mutation for support (G,τB)-tilting pairs over B- mod. Mutations of support τA-tilting pairs and of support (G,τB)-tilting pairs commute with the push-down functor. We derive some consequences of this, and in particular, we derive a τ-tilting analogue of the result of P. Gabriel that locally representation-finiteness is preserved under coverings. Finally, we prove that when the Galois group G is finitely generated free, any rigid A-module (and in particular τA-rigid A-modules) lies in the essential image of the push-down functor.
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