Twisted quantum affinizations and quantization of extended affine Lie algebras

Abstract

In this paper, for an arbitrary Kac-Moody Lie algebra g and a diagram automorphism μ of g satisfying certain natural linking conditions, we introduce and study a μ-twisted quantum affinization algebra U( gμ) of g. When g is of finite type, U( gμ) is Drinfeld's current algebra realization of the twisted quantum affine algebra. When μ=id and g in affine type, U( gμ) is the quantum toroidal algebra introduced by Ginzburg, Kapranov and Vasserot. As the main results of this paper, we first prove a triangular decomposition for U( gμ). Second, we give a simple characterization of the affine quantum Serre relations on restricted U( gμ)-modules in terms of "normal order products". Third, we prove that the category of restricted U( gμ)-modules is a monoidal category and hence obtain a topological Hopf algebra structure on the "restricted completion" of U( gμ). Last, we study the classical limit of U( gμ) and abridge it to the quantization theory of extended affine Lie algebras. In particular, based on a classification result of Allison-Berman-Pianzola, we obtain the -deformation of all nullity 2 extended affine Lie algebras.