Dominant Zeros of Nekrasov--Okounkov Polynomials

Abstract

We give an exact finite-dimensional Perron--Frobenius realization of the dominant zero of the Nekrasov--Okounkov polynomials n(z). For a normalized positive sequence h=(h(n))n 1 with h(1)=1, define 0h(z)=1 and, for n 1, \[ nh(z)=zh(n)Σk=1n σ(k) n-kh(z),\] where σ(k) denotes the sum of divisors of k. The Nekrasov--Okounkov polynomials are obtained from the specialization h(n)=n by the shift n(z)= nh(z+1). We derive a Hessenberg determinant representation for nh(z). After separating the trivial zero at the origin, the remaining zeros of nh(-z) are identified with the eigenvalues of an explicit (n-1)×(n-1) nonnegative matrix Mnh. We prove that Mnh is primitive and apply Perron--Frobenius theory to show that nh(z) has a unique zero of maximal modulus; this zero is real, negative, and simple. As a consequence, the same property holds for the Nekrasov--Okounkov polynomials. We also prove strict monotonicity of the associated spectral radii.