The Lattice of Subobject Closed Subcategories and Colocal Type
Abstract
We consider abelian length categories, a generalization of module categories over Artin algebras. Let A be an abelian length category of colocal type. We show that the lattice S(A) of full additive subobject closed subcategories of A is distributive. Furthermore, we give a characterization of abelian length categories of colocal type. If A is an algebra of colocal type over an algebraically closed field, then this characterization is especially simple and we can describe the lattice S(mod ~A) up to isomorphism.
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