Modular quantizations of Lie algebras of Cartan type H via Drinfeld Twists

Abstract

We construct explicit Drinfel'd twists for the generalized Cartan type H Lie algebras in characteristic 0 and obtain the corresponding quantizations and their integral forms. Via making modular reductions including modulo p reduction and modulo p-restrictedness reduction, and base changes, we derive certain modular quantizations of the restricted universal enveloping algebra u(H(2n;1)) in characteristic p. They are new non-pointed Hopf algebras of truncated p-polynomial noncommutative and noncocommutative deformation of prime-power dimension pp2n-1, which contain the well-known Radford algebras as Hopf subalgebras. As a by-product, we also get some Jordanian quantizations for sp2n.