The Smith Normal Form of a Specialized Jacobi-Trudi Matrix

Abstract

Let JTλ be the Jacobi-Trudi matrix corresponding to the partition λ, so λ is the Schur function sλ in the variables x1,x2,…. Set x1=·s=xn=1 and all other xi=0. Then the entries of JTλ become polynomials in n of the form n+j-1 j. We determine the Smith normal form over the ring Q[n] of this specialization of JTλ. The proof carries over to the specialization xi=qi-1 for 1≤ i≤ n and xi=0 for i>n, where we set qn=y and work over the ring Q(q)[y].