Classifying torsion classes for algebras with radical square zero via sign decomposition

Abstract

To study the set of torsion classes of a finite dimensional basic algebra, we use a decomposition, called sign-decomposition, parametrized by elements of \1\n where n is the number of simple modules. If A is an algebra with radical square zero, then for each ε ∈ \1\n there is a hereditary algebra Aε! with radical square zero and a bijection between the set of torsion classes of A associated to ε and the set of faithful torsion classes of Aε!. Furthermore, this bijection preserves the property of being functorially finite. As an application in τ-tilting theory, we prove that the number of support τ-tilting modules over Brauer line algebras (resp. Brauer odd-cycle algebras) having n edges is 2nn (resp. 22n-1).