The centralizer construction and Yangian-type algebras

Abstract

Let d be a positive integer. The Yangian Yd=Y(gl(d, C)) of the general linear Lie algebra gl(d, C) has countably many generators and quadratic-linear defining relations, which can be packed into a single matrix relation using the Yang matrix -- the famous RTT presentation. Alternatively, Yd can be built from certain centralizer subalgebras of the universal enveloping algebras U(gl(N, C)), with the use of a limit transition as N∞. This approach is called the centralizer construction. The paper shows that a generalization of the centralizer construction leads to a new family \Yd,L: L=1,2,3,…\ of Yangian-type algebras (the Yangian Yd being the first term of this family). For the new algebras, the RTT presentation seems to be missing, but a number of properties of the Yangian Yd persist. In particular, Yd,L possesses a system of quadratic-linear defining relations. The algebras Yd,L (d=1,2,3,…) provide a kind of quantization for a special double Poisson bracket (in the sense of Van den Bergh) on the free associative algebra with L generators.