Overcrowding estimates for zero count and nodal length of stationary Gaussian processes

Abstract

Assuming certain conditions on the spectral measures of centered stationary Gaussian processes on R (or R2), we show that the probability of the event that their zero count in an interval (resp., nodal length in a square domain) is larger than n, where n is much larger than the expected value of the zero count in that interval (resp., nodal length in that square domain), is exponentially small in n.