The formal shift operator on the Yangian double

Abstract

Let g be a symmetrizable Kac-Moody algebra with associated Yangian Yg and Yangian double DYg. An elementary result of fundamental importance to the theory of Yangians is that, for each c∈ C, there is an automorphism τc of Yg corresponding to the translation t t+c of the complex plane. Replacing c by a formal parameter z yields the so-called formal shift homomorphism τz from Yg to the polynomial algebra Yg[z]. We prove that τz uniquely extends to an algebra homomorphism z from the Yangian double DYg into the -adic closure of the algebra of Laurent series in z-1 with coefficients in the Yangian Yg. This induces, via evaluation at any point c∈ C×, a homomorphism from DYg into the completion of the Yangian with respect to its grading. We show that each such homomorphism gives rise to an isomorphism between completions of DYg and Yg and, as a corollary, we find that the Yangian Yg can be realized as a degeneration of the Yangian double DYg. Using these results, we obtain a Poincar\'e-Birkhoff-Witt theorem for DYg applicable when g is of finite type or of simply-laced affine type.