Distributive law between monads

In category theory, an abstract branch of mathematics, distributive laws between monads are a way to express abstractly that two algebraic structures distribute one over the other one.

Suppose that $(S,\mu ^{S},\eta ^{S})$ and $(T,\mu ^{T},\eta ^{T})$ are two monads on a category C. In general, there is no natural monad structure on the composite functor ST. However, there is a natural monad structure on the functor ST if there is a distributive law of the monad S over the monad T.

Formally, a distributive law of the monad S over the monad T is a natural transformation

l:TS\to ST

such that the diagrams

commute.

This law induces a composite monad ST with

as multiplication: $STST\xrightarrow{SlT}SSTT\xrightarrow{\mu^S\mu^T}ST$ ,
as unit: $1\xrightarrow{\eta^S\eta^T}ST$ .

References

Jon Beck (1969). "Distributive laws". Lecture Notes in Mathematics. Lecture Notes in Mathematics. 80: 119–140. doi:10.1007/BFb0083084. ISBN 978-3-540-04601-1.

Michael Barr and Charles Wells (1985). Toposes, Triples and Theories (PDF). Springer-Verlag. ISBN 0-387-96115-1.
Distributive law in nLab
G. Böhm, Internal bialgebroids, entwining structures and corings, AMS Contemp. Math. 376 (2005) 207–226; arXiv:math.QA/0311244
T. Brzeziński, S. Majid, Coalgebra bundles, Comm. Math. Phys. 191 (1998), no. 2, 467–492 arXiv.
T. Brzeziński, R. Wisbauer, Corings and comodules, London Math. Soc. Lec. Note Series 309, Cambridge 2003.
T. F. Fox, M. Markl, Distributive laws, bialgebras, and cohomology. Operads: Proceedings of Renaissance Conferences (Hartford, CT/Luminy, 1995), 167–205, Contemp. Math. 202, AMS 1997.
S. Lack, Composing PROPS, Theory Appl. Categ. 13 (2004), No. 9, 147–163.
S. Lack, R. Street, The formal theory of monads II, Special volume celebrating the 70th birthday of Professor Max Kelly. J. Pure Appl. Algebra 175 (2002), no. 1-3, 243–265.
M. Markl, Distributive laws and Koszulness. Annales de l'Institut Fourier (Grenoble) 46 (1996), no. 2, 307–323 (numdam)
R. Street, The formal theory of monads, J. Pure Appl. Alg. 2, 149–168 (1972)
Z. Škoda, Distributive laws for monoidal categories (arXiv:0406310); Equivariant monads and equivariant lifts versus a 2-category of distributive laws (arXiv:0707.1609); Bicategory of entwinings arXiv:0805.4611
Z. Škoda, Some equivariant constructions in noncommutative geometry, Georgian Math. J. 16 (2009) 1; 183–202 arXiv:0811.4770
R. Wisbauer, Algebras versus coalgebras. Appl. Categ. Structures 16 (2008), no. 1-2, 255–295.

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Distributive law between monads

See also

References