Complete determination of the zeta function of the Hilbert scheme of n points on a two-dimensional torus

Abstract

We compute the coefficients of the polynomials Cn(q) defined by the equation equation* 1 + Σn≥ 1 \, Cn(q)qn \, tn = Πi≥ 1\, (1-ti)21-(q+q-1)ti + t2i \, . equation* As an application we obtain an explicit formula for the zeta function of the Hilbert scheme of n points on a two-dimensional torus and show that this zeta function satisfies a remarkable functional equation. The polynomials Cn(q) are divisible by (q-1)2. We also compute the coefficients of the polynomials Pn(q) = Cn(q)/(q-1)2: each coefficient counts the divisors of n in a certain interval; it is thus a non-negative integer. Finally we give arithmetical interpretations for the values of Cn(q) and of Pn(q) at q = -1 and at roots of unity of order 3, 4, 6.