Multijet bundles and application to the finiteness of moments for zeros of Gaussian fields

Abstract

We define a notion of multijet for functions on Rn, which extends the classical notion of jets in the sense that the multijet of a function is defined by contact conditions at several points. For all p ≥ 1 we build a vector bundle of p-multijets, defined over a well-chosen compactification of the configuration space of p distinct points in Rn. As an application, we prove that the linear statistics associated with the zero set of a centered Gaussian field on a Riemannian manifold have a finite p-th moment as soon as the field is of class~Cp and its (p-1)-jet is nowhere degenerate. We prove a similar result for the linear statistics associated with the critical points of a Gaussian field and those associated with the vanishing locus of a holomorphic Gaussian field.