Quantum folding

Abstract

In the present paper we introduce a quantum analogue of the classical folding of a simply-laced Lie algebra g to the non-simply-laced algebra gsigma along a Dynkin diagram automorphism sigma of g For each quantum folding we replace gsigma by its Langlands dual gsigmav and construct a nilpotent Lie algebra n which interpolates between the nilpotnent parts of g and (gsigma)v, together with its quantized enveloping algebra Uq(n) and a Poisson structure on S(n). Remarkably, for the pair (g, (gsigma)v)=(so2n+2,sp2n), the algebra Uq(n) admits an action of the Artin braid group Brn and contains a new algebra of quantum n x n matrices with an adjoint action of Uq(sln), which generalizes the algebras constructed by K. Goodearl and M. Yakimov in [12]. The hardest case of quantum folding is, quite expectably, the pair (so8,G2) for which the PBW presentation of Uq(n) and the corresponding Poisson bracket on S(n) contain more than 700 terms each.