A comment of the combinatorics of the vertex operator (t|X)

Abstract

The Jacobi--Trudi identity associates a symmetric function to any integer sequence. Let (t|X) be the vertex operator defined by (t|X) sα =Σn ∈ Z s(n,α) [X] tn. We provide a combinatorial proof for the identity (t|X) sα = σ[tX] sα[x-1/t] due to Thibon et al. We include an overview of all the combinatorial ideas behind this beautiful identity, including a combinatorial description for the expansion of s(n,α) [X] in the Schur basis, for any integer value of n.