Universality of the nodal length of bivariate random trigonometric polynomials

Abstract

We consider random trigonometric polynomials of the form \[ fn(x,y)=Σ1 k,l n ak,l (kx) (ly), \] where the entries (ak,l)k,l 1 are i.i.d. random variables that are centered with unit variance. We investigate the length K(fn) of the nodal set ZK(fn) of the zeros of fn that belong to a compact set K ⊂ R2. We first establish a local universality result, namely we prove that, as n goes to infinity, the sequence of random variables n\, K/n(fn) converges in distribution to a universal limit which does not depend on the particular law of the entries. We then show that at a macroscopic scale, the expectation of [0,π]2(fn)/n also converges to an universal limit. Our approach provides two main byproducts: (i) a general result regarding the continuity of the volume of the nodal sets with respect to C1-convergence which refines previous findings of Rusakov et al., Iksanov et al. and Aza\"is et al., and (ii) a new strategy for proving small ball estimates in random trigonometric models, providing in turn uniform local controls of the nodal volumes.