1. Pre-torsors and Galois Comodules Over Mixed Distributive Laws
- Author
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Claudia Menini and Gabriella Böhm
- Subjects
Algebra and Number Theory ,Functor ,General Computer Science ,(co)monad ,Mathematics::Rings and Algebras ,Equalizer ,Mathematics - Rings and Algebras ,Commutative ring ,Bicategory ,Adjunction ,NO ,Theoretical Computer Science ,(co)monad, Galois functor, pre-torsor ,Comodule ,Distributive property ,Rings and Algebras (math.RA) ,Mathematics::Category Theory ,Law ,Mathematics - Quantum Algebra ,FOS: Mathematics ,Quantum Algebra (math.QA) ,Galois functor ,pre-torsor ,Equivalence (formal languages) ,Mathematics - Abstract
We study comodule functors for comonads arising from mixed distributive laws. Their Galois property is reformulated in terms of a (so-called) regular arrow in Street's bicategory of comonads. Between categories possessing equalizers, we introduce the notion of a regular adjunction. An equivalence is proven between the category of pre-torsors over two regular adjunctions $(N_A,R_A)$ and $(N_B,R_B)$ on one hand, and the category of regular comonad arrows $(R_A,\xi)$ from some equalizer preserving comonad ${\mathbb C}$ to $N_BR_B$ on the other. This generalizes a known relationship between pre-torsors over equal commutative rings and Galois objects of coalgebras.Developing a bi-Galois theory of comonads, we show that a pre-torsor over regular adjunctions determines also a second (equalizer preserving) comonad ${\mathbb D}$ and a co-regular comonad arrow from ${\mathbb D}$ to $N_A R_A$, such that the comodule categories of ${\mathbb C}$ and ${\mathbb D}$ are equivalent., Comment: 34 pages LaTeX file. v2: a few typos corrected
- Published
- 2009
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