Determinantal processes and completeness of random exponentials: the critical case

Abstract

For a locally finite point set ⊂ R, consider the collection of exponential functions given by E:= \ei λ x : λ ∈ L \. We examine the question whether E spans the Hilbert space L2[-π,π], when is random. For several point processes of interest, this belongs to a certain critical case of the corresponding question for deterministic , about which little is known. For the continuum sine kernel process, obtained as the bulk limit of GUE eigenvalues, we establish that E is indeed complete. We also answer an analogous question on C for the Ginibre ensemble, arising as weak limits of certain non-Hermitian random matrix eigenvalues. In fact we establish completeness for any "rigid" determinantal point process in a general setting. In addition, we partially answer two questions due to Lyons and Steif about stationary determinantal processes on Zd.