Pointed Hopf algebras over non abelian groups with decomposable braidings, I

Published 10 May 2019 in math.QA and math.RA | (1905.04285v1)

Abstract: We describe all finite-dimensional pointed Hopf algebras whose infinitesimal braiding is a fixed Yetter-Drinfeld module decomposed as the sum of two simple objects: a point and the one of transpositions of the symmetric group in three letters. We give a presentation by generators and relations of the corresponding Nichols algebra and show that Andruskiewitsch-Schneider Conjecture holds for this kind of pointed Hopf algebras.

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Pointed Hopf algebras over non abelian groups with decomposable braidings, I

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Pointed Hopf algebras over non abelian groups with decomposable braidings, I

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