τ-cluster morphism categories of factor algebras

Abstract

We take a novel lattice-theoretic approach to the τ-cluster morphism category T(A) of a finite-dimensional algebra A and define the category via the lattice of torsion classes tors A. Using the lattice congruence induced by an ideal I of A we establish a functor FI: T(A) T(A/I). If tors A is finite, FI is a regular epimorphism in the category of small categories and we characterise when FI is full and faithful. The construction is purely combinatorial, meaning that the lattice of torsion classes determines the τ-cluster morphism category up to equivalence.