Pushforward monads

Abstract

Given a monad T on A and a functor G A B, one can construct a monad G\#T on B subject to the existence of a certain Kan extension; this is the pushforward of T along G. We develop the general theory of this construction in a 2-category, giving two universal properties it satisfies. In the case of monads in CAT, this gives, among other things, two adjunctions between categories of monads on A and B. We conclude by computing the pushforward of several familiar monads on the category of finite sets along the inclusion FinSet FinSet, which produces the monad for continuous lattices, among others. We also show that, with two trivial exceptions, these pushforwards never have rank.