Asymptotics of Schur functions on almost staircase partitions

Abstract

We study the asymptotics of Schur polynomials with partitions λ which are almost staircase; more precisely, partitions that differ from ((m-1)(N-1),(m-1)(N-2),…,(m-1),0) by at most one component at the beginning as N→ ∞, for a positive integer m 1 independent of N. By applying either determinant formulas or integral representations for Schur functions, we show that 1N sλ(u1,…,uk, xk+1,…,xN)sλ(x1,…,xN) converges to a sum of k single-variable holomorphic functions, each of which depends on the variable ui for 1≤ i≤ k, when there are only finitely many distinct xi's and each ui is in a neighborhood of xi, as N→∞. The results are related to the law of large numbers and central limit theorem for the dimer configurations on contracting square-hexagon lattices with certain boundary conditions.