On the Vertex Operator Representation of Lie Algebras of Matrices

Abstract

The polynomial ring Br:=Q[e1,…,er] in r indeterminates is a representation of the Lie algebra of all the endomorphism of Q[X] vanishing at powers Xj for all but finitely many j. We determine a Br-valued formal power series in r+2 indeterminates which encode the images of all the basis elements of Br under the action of the generating function of elementary endomorphisms of Q[X], which we call the structural series of the representation. The obtained expression implies (and improves) a formula by Gatto & Salehyan, which only computes, for one chosen basis element, the generating function of its images. For sake of completeness we construct in the last section the B=B∞-valued structural formal power series which consists in the evaluation of the vertex operator describing the bosonic representation of gl∞(Q) against the generating function of the standard Schur basis of B. This provide an alternative description of the bosonic representation of gl∞ due to Date, Jimbo, Kashiwara and Miwa which does not involve explicitly exponential of differential operators.