Convex PBW-type Lyndon Bases and Restricted Two-Parameter Quantum Group of Type F4

Abstract

We determine convex PBW-type Lyndon bases for two-parameter quantum groups Ur,s(F4) with detailed commutation relations. We construct a finite-dimensional Hopf algebra ur,s(F4), as a quotient of Ur,s(F4) by a Hopf ideal generated by certain central elements, which is pointed, and of a Drinfel'd double structure under a certain condition. All of Hopf isomorphisms of ur,s(F4) are determined which are important for seeking the possible new pointed objects in low order with (, 210) 1. Finally, necessary and sufficient conditions for ur,s(F4) to be a ribbon Hopf algebra are singled out by describing the left and right integrals.