Relative rigid subcategories and τ-tilting theory

Abstract

Let B be an extriangulated category with enough projectives P and enough injectives I, and let R be a contravariantly finite rigid subcategory of B which contains P. We have an abelian quotient category H/ R⊂eq B/ R which is equivalent mod( R/ P). In this article, we find a one-to-one correspondence between support τ-tilting (resp. τ-rigid) subcategories of H/ R and maximal relative rigid (resp. relative rigid) subcategories of H, and show that support tilting subcategories in H/ R is a special kind of support τ-tilting subcategories. We also study the relation between tilting subcategories of B/ R and cluster tilting subcategories of B when R is cluster tilting.