Boundedness of the nodal domains of additive Gaussian fields

Abstract: We study the connectivity of the excursion sets of additive Gaussian fields, i.e. stationary centred Gaussian fields whose covariance function decomposes into a sum of terms that depend separately on the coordinates. Our main result is that, under mild smoothness and correlation decay assumptions, the excursion sets {f ≤ } of additive planar Gaussian fields are bounded almost surely at the critical level c = 0. Since we do not assume positive correlations, this provides the first examples of continuous non-pos… Show more