Wreaths, mixed wreaths and twisted coactions

Abstract

Distributive laws between two monads in a 2-category , as defined by Jon Beck in the case =Cat, were pointed out by the author to be monads in a 2-category Mnd of monads. Steve Lack and the author defined wreaths to be monads in a 2-category EM of monads with different 2-cells from Mnd. Mixed distributive laws were also considered by Jon Beck, Mike Barr and, later, various others, they are comonads in Mnd. Actually, as pointed out by John Power and Hiroshi Watanabe, there are a number of dual possibilities for mixed distributive laws. It is natural then to consider mixed wreaths as we do in this article, they are comonads in EM. There are also mixed opwreaths: comonoids in the Kleisli construction completion Kl of . The main example studied here arises from a twisted coaction of a bimonoid on a monoid. Corresponding to the wreath product on the mixed side is wreath convolution, which is composition in a Kleisli-like construction. Walter Moreira's Heisenberg product of linear endomorphisms on a Hopf algebra, is an example of such convolution, actually involving merely a mixed distributive law. Monoidality of the Kleisli-like construction is also discussed.