English

Centralizer construction for twisted Yangians

q-alg 2008-03-02 v1 Quantum Algebra Exactly Solvable and Integrable Systems solv-int

Abstract

For each of the classical Lie algebras g(n)=o(2n+1),sp(2n),o(2n)g(n)=o(2n+1), sp(2n), o(2n) of type B, C, D we consider the centralizer of the subalgebra g(nm)g(n-m) in the universal enveloping algebra U(g(n))U(g(n)). We show that the nnth centralizer algebra can be naturally projected onto the (n1)(n-1)th one, so that one can form the projective limit of the centralizer algebras as nn\to\infty with mm fixed. The main result of the paper is a precise description of this limit (or stable) centralizer algebra, denoted by AmA_m. We explicitly construct an algebra isomorphism Am=ZYmA_m=Z\otimes Y_m, where ZZ is a commutative algebra and YmY_m is the so-called twisted Yangian associated to the rank mm classical Lie algebra of type B, C, or D. The algebra ZZ may be viewed as the algebra of virtual Laplace operators; it is isomorphic to the algebra of polynomials with countably many indeterminates. The twisted Yangian YmY_m (and hence the algebra AmA_m) can be described in terms of a system of generators with quadratic and linear defining relations which are conveniently presented in R-matrix form involving the so-called reflection equation. This extends the earlier work on the type A case by the second author.

Keywords

Cite

@article{arxiv.q-alg/9712050,
  title  = {Centralizer construction for twisted Yangians},
  author = {Alexander Molev and Grigori Olshanski},
  journal= {arXiv preprint arXiv:q-alg/9712050},
  year   = {2008}
}

Comments

AMSTeX, 46 pages