A bicategorical version of Masuoka's theorem. Applications to bimodules over functor categories and to firm bimodules
Abstract
We give a bicategorical version of the main result of A. Masuoka (Corings and invertible bimodules, Tsukuba J. Math. 13 (1989), 353--362) which proposes a non-commutative version of the fact that for a faithfully flat extension of commutative rings R ⊂eq S, the relative Picard group Pic(S/R) is isomorphic to the Amitsur 1--cohomology group H1(S/R,U) with coefficients in the units functor U.
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