Random plane wave is conjectured to be a universal model for high-energy eigenfunctions of the Laplace operator on generic compact Riemannian manifolds. This is known to be true on average. In the present paper we discuss one of important geometric observable: critical points. We first compute one-point function for the critical point process, in particular we compute the expected number of critical points inside any open set. After that we compute the short-range asymptotic behaviour of the two-point function. This gives an unexpected result that the second factorial moment of the number of critical points in a small disc scales as the fourth power of the radius.
Two Point Function for Critical Points of a Random Plane Wave / Beliaev, Dmitry; Cammarota, Valentina; Wigman, Igor. - In: INTERNATIONAL MATHEMATICS RESEARCH NOTICES. - ISSN 1073-7928. - 2019:9(2019), pp. 2661-2689. [10.1093/imrn/rnx197]
Two Point Function for Critical Points of a Random Plane Wave
Cammarota, ValentinaMembro del Collaboration Group
;
2019
Abstract
Random plane wave is conjectured to be a universal model for high-energy eigenfunctions of the Laplace operator on generic compact Riemannian manifolds. This is known to be true on average. In the present paper we discuss one of important geometric observable: critical points. We first compute one-point function for the critical point process, in particular we compute the expected number of critical points inside any open set. After that we compute the short-range asymptotic behaviour of the two-point function. This gives an unexpected result that the second factorial moment of the number of critical points in a small disc scales as the fourth power of the radius.| File | Dimensione | Formato | |
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Beliaev_.Two-Point-Function_2017.pdf
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