Universal quantum (semi)groups and Hopf envelopes
Abstract
We prove that, in case = the FRT construction of a braided vector space admits a weakly Frobenius algebra (e.g. if the braiding is rigid and its Nichols algebra is finite dimensional), then the Hopf envelope of is simply the localization of by a single element called the quantum determinant associated to the weakly Frobenius algebra. This generalizes a result of the author together with Gast\'on A. Garc\'ia in \cite{FG}, where the same statement was proved, but with extra hypotheses that we now know were unnecessary. On the way, we describe a universal way of constructing a universal bialgebra attached to a finite dimensional vector space together with some algebraic structure given by a family of maps . The Dubois-Violette and Launer Hopf algebra and the co-quasi triangular property of the FRT construction play a fundamental role on the proof.
Cite
@article{arxiv.2008.09937,
title = {Universal quantum (semi)groups and Hopf envelopes},
author = {Marco Farinati},
journal= {arXiv preprint arXiv:2008.09937},
year = {2020}
}
Comments
20 pages. References and a comment on path algebras added