Adjunctions between Eilenberg-Moore categories and a PBW-type theorem
Abstract
Recently, Dotsenko and Tamaroff have shown that a morphism of T S of monads over a category C satisfies the PBW-property if and only if it makes S into a free right T-module. We consider an adjunction =(G,F) between categories C, D, a monad S on C and a monad T on D. We show that a morphism φ:( C,S) ( D,T) that is well behaved with respect to the adjunction has a PBW-property if and only if it makes S satisfy a certain freeness condition with respect to T-modules with values in C.
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