Monads and comonads in module categories
Abstract
Let be a ring and the category of -modules. It is well known in module theory that for any -bimodule , is an -ring if and only if the functor is a monad (or triple). Similarly, an -bimodule is an -coring provided the functor is a comonad (or cotriple). The related categories of modules (or algebras) of and comodules (or coalgebras) of are well studied in the literature. On the other hand, the right adjoint endofunctors and are a comonad and a monad, respectively, but the corresponding (co)module categories did not find much attention so far. The category of -comodules is isomorphic to the category of -modules, while the category of -modules (called -contramodules by Eilenberg and Moore) need not be equivalent to the category of -comodules. The purpose of this paper is to investigate these categories and their relationships based on some observations of the categorical background. This leads to a deeper understanding and characterisations of algebraic structures such as corings, bialgebras and Hopf algebras. For example, it turns out that the categories of -comodules and -modules are equivalent provided is a coseparable coring. Furthermore, a bialgebra over a commutative ring is a Hopf algebra if and only if is a Hopf bimonad on and in this case the categories of -Hopf modules and mixed -bimodules are both equivalent to .
Cite
@article{arxiv.0804.1460,
title = {Monads and comonads in module categories},
author = {Gabriella Böhm and Tomasz Brzezinski and Robert Wisbauer},
journal= {arXiv preprint arXiv:0804.1460},
year = {2012}
}
Comments
35 pages, LaTeX