Semibricks and Brick-finite algebras
Abstract
Let Λ be a finite-dimensional algebra. Using the kappa order on the lattice of torsion classes with canonical join representations, we obtain an equivalent condition for Λ to be brick-finite. We show that Λ is brick-finite if and only if every widely generated torsion class in Λ has finitely many covers with respect to the kappa order. Furthermore, we prove that every semibrick in Λ is a finite set if and only if every chain of wide subcategories of Λ is eventually constant. We also show that Λ is brick-finite if and only if every chain of widely generated torsion classes of Λ is eventually constant. Finally, we show that Λ is brick-finite if and only if every cofinally closed monobrick is a cofinal closure of some semibrick.
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