Infinitesimal R-matrices for some families of Hopf algebras
Abstract
Given a bialgebra H such that the associated trivial topological bialgebra H[[]] admits a quasitriangular structure R=R(1 1++O(2)), one gets a distinguished element ∈ H H which is an infinitesimal R-matrix, according to the definition given in [1]. In this paper we classify infinitesimal R-matrices for some families of well-known Hopf algebras, among which are the generalized Kac-Paljutkin Hopf algebras H2n2, the Radford Hopf algebras H(r,n,q), and the Hopf algebras E(n).
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