On τ-tilting subcategories

Abstract

The main theme of this paper is to study τ-tilting subcategories in an abelian category A with enough projective objects. We introduce the notion of τ-cotorsion torsion triples and show a bijection between the collection of τ-cotorsion torsion triples in A and the collection of τ-tilting subcategories of A, generalizing the bijection by Bauer, Botnan, Oppermann and Steen between the collection of cotorsion torsion triples and the collection of tilting subcategories of A. General definitions and results are exemplified using persistent modules. If A=ModR, where R is an unitary associative ring, we characterize all support τ-tilting, resp. all support τ--tilting, subcategories of ModR in term of finendo quasitilting, resp. quasicotilting, modules. As a result, it will be shown that every silting module, respectively every cosilting module, induces a support τ-tilting, respectively support τ--tilting, subcategory of ModR. We also study the theory in Rep(Q, A), where Q is a finite and acyclic quiver. In particular, we give an algorithm to construct support τ-tilting subcategories in Rep(Q, A) from certain support τ-tilting subcategories of A and present a systematic way to construct (n+1)-tilting subcategories in Rep(Q, A) from n-tilting subcategories in A.

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