On derived categories of module categories over multiring categories

Abstract

Let A and B be subcategories of tensor categories C and D, respectively, both of which are abelian categories with finitely many isomorphism classes of simple objects. We prove that if their derived categories Db(A) and Db(B) are left triangulated tensor ideals and are equivalent as triangulated Db(C)-module categories via an equivalence induced by a monoidal triangulated functor F:Db(C)→ Db(D), then the original module categories A and B are themselves equivalent. We then apply this result to smash product algebras. Furthermore, the localization theory of module categories and triangulated module categories is investigated.