Finite-dimensional pointed Hopf algebras of type An related to the Faddeev-Reshetikhin-Takhtajan U(R) construction

Abstract

Two "quantum enveloping algebras", here denoted by U(R) and U(R), are associated in [FRTa] and [FRTb] to any Yang-Baxter operator R. The latter is only a bialgebra, in general; the former is a Hopf algebra. In this paper, we study the pointed Hopf algebras U(RQ), where RQ is the Yang-Baxter operator associated with the multi-parameter deformation of GLn supplied in [AST]; cf also [S,Re]. Some earlier results concerning these Hopf algebras U(RQ) were obtained in [To,CLMT,CM]; a related (but different) Hopf algebra was studied in [DP]. The main new results obtained here concerning these quantum enveloping algebras are: 1)We list, in an extremely explicit form, those quantum enveloping algebras U(RQ) which are finite-dimensional--let U denote the collection of these. 2)We verify that the pointed Hopf algebras in U are quasitriangular and of Cartan type An in the sense of Andruskiewich-Schneider. 3)We show that every U(RQ) is a Hopf quotient of a double cross-product (hence, as asserted in 2), is quasitriangular if finite-dimensional.) 4) CAUTION: These Hopf algebras are NOT always cocycle twists of the standard 1-parameter deformation. This somewhat surprising fact is an immediate consequence of the data furnished here-- clearly a cocycle twist will not convert an infinite-dimensional Hopf algebra to a finite-dimensional one! Furthermore, these Hopf algebras in U are (it is proved) not all cocycle twists of each other. 5)We discuss also the case when the quantum determinant is central in A(RQ), so it makes sense to speak of a Q-deformation of the special linear group.

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