Motivic zeta function of the Hilbert schemes of points on a surface

Abstract

Let K be a discretely-valued field. Let X→ Spec K be a surface with trivial canonical bundle. In this paper we construct a weak N\'eron model of the schemes Hilbn(X) over the ring of integers R⊂eq K. We exploit this construction in order to compute the Motivic Zeta Function of Hilbn(X) in terms of ZX. We determine the poles of ZHilbn(X) and study its monodromy property, showing that if the monodromy conjecture holds for X then it holds for Hilbn(X) too. Sit K corpus cum absoluto ualore discreto. Sit X→ Spec K leuigata superficies cum canonico fasce congruenti OX. In hoc scripto defecta Neroniensia paradigmata Hilbn(X) schematum super annulo integrorum in K corpo, R ⊂ K, constituimus. Ex hoc, Functionem Zetam Motiuicam ZHilbn(X), dato ZX, computamus. Suos polos statuimus et suam monodromicam proprietatem studemus, coniectura monodromica, quae super X ualet, ualere super Hilbn(X) quoque demostrando.