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We study the blow-ups of configuration spaces. These spaces have a structure of what we call an Orlik–Solomon manifold; it allows us to compute the intersection cohomology of certain flat connections with logarithmic singularities using some Aomoto type complexes of logarithmic forms. Using this construction we realize geometrically the ${𝔰𝔩}_{2}$ Bernstein–Gelfand–Gelfand resolution as an Aomoto complex.

Bialgebra structures on a real semisimple Lie algebra.

Chloup, Véronique (1995)

Bulletin of the Belgian Mathematical Society - Simon Stevin

Bicovariant differential calculi and cross products on braided Hopf algebras

Yuri Bespalov, Bernhard Drabant (1997)

Banach Center Publications

In a braided monoidal category C we consider Hopf bimodules and crossed modules over a braided Hopf algebra H. We show that both categories are equivalent. It is discussed that the category of Hopf bimodule bialgebras coincides up to isomorphism with the category of bialgebra projections over H. Using these results we generalize the Radford-Majid criterion and show that bialgebra cross products over the Hopf algebra H are precisely described by H-crossed module bialgebras. In specific braided monoidal...

Bicrossproduct Hopf quasigroups

Jennifer Klim, Shahn Majid (2010)

Commentationes Mathematicae Universitatis Carolinae

We recall the notion of Hopf quasigroups introduced previously by the authors. We construct a bicrossproduct Hopf quasigroup $k M ▹ ◂ k (G)$ from every group $X$ with a finite subgroup $G \subset X$ and IP quasigroup transversal $M \subset X$ subject to certain conditions. We identify the octonions quasigroup $G_{𝕆}$ as transversal in an order 128 group $X$ with subgroup $ℤ_{2}^{3}$ and hence obtain a Hopf quasigroup $k G_{𝕆} > ◂ k (ℤ_{2}^{3})$ as a particular case of our construction.

Bigèbres de Lie, doubles et carrés

R. Aminou, Y. Kosmann-Schwarzbach (1988)

Annales de l'I.H.P. Physique théorique

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