Covering techniques in higher Auslander-Reiten theory

Abstract

This paper investigates the behavior of n-precluster tilting subcategories under the push-down functor in the context of Galois coverings of locally bounded categories. Building on higher Auslander-Reiten theory and covering techniques, we establish that for a locally support-finite category C with a free group action G on its indecomposables, the push-down functor maps G-equivariant n-precluster tilting subcategories of mod-C to n-precluster tilting subcategories of mod-(C/G), and vice versa. These results provide a framework for studying τn-selfinjective algebras. We further prove that mod-C is n-minimal Auslander-Gorenstein if and only if mod-(C/G) is so, under square-free conditions on C/G. Additionally, we analyze support τn-tilting pairs via the push-down functor, showing that locally τn-tilting finiteness is preserved under Galois coverings. Our work offers new insights into the interplay between higher homological algebra and covering theory in representation-finite contexts.