The coquasitriangular Hopf algebra associated to a rigid Yang-Baxter coalgebra (Q2762045)

A Yang-Baxter coalgebra is a pair \((C,\sigma)\) consisting of a coalgebra \(C\) and an invertible bilinear form \(\sigma\colon C\times C\to k\) satisfying a certain condition. This concept was introduced by \textit{Y. Doi} [Commun. Algebra 21, No. 5, 1731-1749 (1993; Zbl 0779.16015)], who associated a coquasitriangular (shortly CQT) bialgebra \(M(C,\sigma)\) to any such pair. The main result of the paper under review is that there exists a CQT Hopf algebra \(H\) and a CQT bialgebra map from \(M(C,\sigma)\) to \(H\) if and only if \(\sigma\) is skew-invertible. Therefore there exists a coalgebra map from \(C\) to a CQT Hopf algebra such that \(\sigma\) comes from the CQT structure if and only if \(\sigma\) is skew-invertible (in this case \((C,\sigma)\) is also called rigid).NEWLINENEWLINEFor the entire collection see [Zbl 0958.00024].