Minimal inclusions of torsion classes

Abstract

Let be a finite-dimensional associative algebra. The torsion classes of mod\, form a lattice under containment, denoted by tors\, . In this paper, we characterize the cover relations in tors\, by certain indecomposable modules. We consider three applications: First, we show that the completely join-irreducible torsion classes (torsion classes which cover precisely one element) are in bijection with bricks. Second, we characterize faces of the canonical join complex of tors\, in terms of representation theory. Finally, we show that, in general, the algebra is not characterized by its lattice tors\, . In particular, we study the torsion theory of a quotient of the preprojective algebra of type An. We show that its torsion class lattice is isomorphic to the weak order on An.