The formal theory of multimonoidal monads

Abstract

Certain aspects of Street's formal theory of monads in 2-categories are extended to multimonoidal monads in symmetric strict monoidal 2-categories. Namely, any symmetric strict monoidal 2-category M admits a symmetric strict monoidal 2-category of pseudomonoids, monoidal 1-cells and monoidal 2-cells in M. Dually, there is a symmetric strict monoidal 2-category of pseudomonoids, opmonoidal 1-cells and opmonoidal 2-cells in M. Extending a construction due to Aguiar and Mahajan for M=Cat, we may apply the first construction p-times and the second one q-times (in any order). It yields a 2-category Mpq. A 0-cell therein is an object A of M together with p+q compatible pseudomonoid structures; it is termed a (p+q)-oidal object in M. A monad in Mpq is called a (p,q)-oidal monad in M; it is a monad t on A in M together with p monoidal, and q opmonoidal structures in a compatible way. If M has monoidal Eilenberg-Moore construction, and certain (Linton type) stable coequalizers exist, then a (p+q)-oidal structure on the Eilenberg-Moore object At of a (p,q)-oidal monad (A,t) is shown to arise via a symmetric strict monoidal double functor to Ehresmann's double category Sqr ( M) of squares in M, from the double category of monads in Sqr ( M) in the sense of Fiore, Gambino and Kock. While q ones of the pseudomonoid structures of At are lifted along the `forgetful' 1-cell At A, the other p ones are lifted along its left adjoint. In the particular example when M is an appropriate 2-subcategory of Cat, this yields a conceptually different proof of some recent results due to Aguiar, Haim and L\'opez Franco.