A bicategorical version of Masuoka's theorem. Applications to bimodules over functor categories and to firm bimodules

B. Mesablishvili; J. G\'omez-Torrecillas

arxiv: 0808.2553 · v1 · submitted 2008-08-19 · 🧮 math.RA · math.CT

A bicategorical version of Masuoka's theorem. Applications to bimodules over functor categories and to firm bimodules

J. G\'omez-Torrecillas , B. Mesablishvili This is my paper

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keywords bimodulesversionbicategoricalfunctorgroupmasuokaamitsurapplications

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We give a bicategorical version of the main result of A. Masuoka ({Corings and invertible bimodules,} {\em Tsukuba J. Math.} \textbf{13} (1989), 353--362) which proposes a non-commutative version of the fact that for a faithfully flat extension of commutative rings $R \subseteq S$, the relative Picard group $Pic(S/R)$ is isomorphic to the Amitsur 1--cohomology group $H^1(S/R,U)$ with coefficients in the units functor $U$.

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A bicategorical version of Masuoka's theorem. Applications to bimodules over functor categories and to firm bimodules

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