Concentration for nodal component count of Gaussian Laplace eigenfunctions

Abstract

We study nodal component count of the following Gaussian Laplace eigenfunctions: monochromatic random waves (MRW) on R2, arithmetic random waves (ARW) on T2 and random spherical harmonics (RSH) on S2. Exponential concentration for nodal component count of RSH on S2 and ARW on T2 were established by Nazarov-Sodin and Rozenshein respectively. We prove exponential concentration for nodal component count in the following three cases: MRW on growing Euclidean balls in R2; RSH and ARW on geodesic balls, in S2 and T2 respectively, whose radius is slightly larger than the wavelength scale.