Další seminář z algebry se koná 18.2.2021 od 13.00 online na platformě ZOOM. Informace pro připojení a další program semináře je zde. Charles Walker
Distributive laws, pseudodistributive laws and decagons
Abstrakt: The notion of a distributive law of monads was introduced by Beck [1], and gives a concise description of the data required to compose monads. In the two dimensional case, Marmolejo [4] defined pseudodistributive laws of pseudomonads (where the required diagrams only commute up to an invertible modification). However, this description requires a number of coherence conditions due to the extra data involved. In this talk we give alternative definitions of distributive laws and pseudodistributive laws involving the decagonal coherence conditions which naturally arise when the involved monads and pseudomonads are presented in their extensive form [7, 3, 2, 6]. As an application, we show that of Marmolejo and Wood’s eight coherence axioms for pseudodistributive laws [5], three are redundant. We will then go on to give (likely) minimal definitions of distributive laws and pseudodistributive laws, which further simplify the coherence conditions involved in this extensive viewpoint. References [1] Jon Beck. Distributive laws. In Sem. on Triples and Categorical Homology Theory (ETH, Zürich, 1966/67), pages 119–140. Springer, Berlin, 1969. [2] M. Fiore, N. Gambino, M. Hyland, and G. Winskel. Relative pseudomonads, Kleisli bicate gories, and substitution monoidal structures. Selecta Math. (N.S.), 24(3):2791–2830, 2018. [3] Ernest G. Manes. Algebraic theories. SpringerVerlag, New YorkHeidelberg, 1976. Graduate Texts in Mathematics, No. 26. [4] F. Marmolejo. Distributive laws for pseudomonads. Theory Appl. Categ., 5:No. 5, 91–147, 1999. [5] F. Marmolejo and R. J. Wood. Coherence for pseudodistributive laws revisited. Theory Appl. Categ., 20:No. 5, 74–84, 2008. [6] F. Marmolejo and R. J. Wood. Noiteration pseudomonads. Theory Appl. Categ., 28:No. 14, 371–402, 2013. [7] Robert Frank Carslaw Walters. A categorical approach to universal algebra. PhD thesis, Australian National University, 1970.
