Gaussian Random Measures Generated by Berry's Nodal Sets
Abstract
We consider vectors of random variables, obtained by restricting the length of the nodal set of Berry's random wave model to a finite collection of (possibly overlapping) smooth compact subsets of . Our main result shows that, as the energy diverges to infinity and after an adequate normalisation, these random elements converge in distribution to a Gaussian vector, whose covariance structure reproduces that of a homogeneous independently scattered random measure. A by-product of our analysis is that, when restricted to rectangles, the dominant chaotic projection of the nodal length field weakly converges to a standard Wiener sheet, in the Banach space of real-valued continuous mappings over a fixed compact set. An analogous study is performed for complex-valued random waves, in which case the nodal set is a locally finite collection of random points.
Cite
@article{arxiv.1909.05549,
title = {Gaussian Random Measures Generated by Berry's Nodal Sets},
author = {Giovanni Peccati and Anna Vidotto},
journal= {arXiv preprint arXiv:1909.05549},
year = {2020}
}
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33 pages