The top-degree part in the Matchings-Jack Conjecture

Abstract

In 1996 Goulden and Jackson introduced a family of coefficients ( cπ, σλ ) indexed by triples of partitions which arise in the power sum expansion of some Cauchy sum for Jack symmetric functions ( J(α )π ). The coefficients cπ, σλ can be viewed as an interpolation between the structure constants of the class algebra and the double coset algebra. Goulden and Jackson suggested that the coefficients cπ, σλ are polynomials in the variable β := α-1 with non-negative integer coefficients and that there is a combinatorics of matching hidden behind them. This Matchings-Jack Conjecture remains open. Doega and F\'eray showed the polynomiality of connection coefficients cλπ,σ and gave the upper bound on the degrees. We give a necessary and sufficient condition for the polynomial cπ, σλ to achieve this bound. We show that the leading coefficient of cπ, σλ is a positive integer and we present it in the context of Matchings-Jack Conjecture of Goulden and Jackson.