Quasi-independence for nodal lines

Abstract

We prove a quasi-independence result for level sets of a planar centered stationary Gaussian field with covariance (x,y)(x-y). As a first application, we study percolation for nodal lines in the spirit of [BG16]. In the said article, Beffara and Gayet rely on Tassion's method ([Tas16]) to prove that, under some assumptions on , most notably that ≥ 0 and (x)=O(|x|-325), the nodal set satisfies a box-crossing property. The decay exponent was then lowered to 16+ by Beliaev and Muirhead in [BM17]. In the present work we lower this exponent to 4+ thanks to a new approach towards quasi-independence for crossing events. This approach does not rely on quantitative discretization. Our quasi-independence result also applies to events counting nodal components and we obtain a lower concentration result for the density of nodal components around the Nazarov and Sodin constant from [NS15].