Asymptotic laws for the spatial distribution and the number of connected components of zero sets of Gaussian random functions

F. Nazarov; M. Sodin

doi:10.15407/mag12.03.205

Asymptotic laws for the spatial distribution and the number of connected components of zero sets of Gaussian random functions

F. Nazarov
, M. Sodin

School of Mathematical Sciences

Tel Aviv University

Research output: Contribution to journal › Article › peer-review

Abstract

We study the asymptotic laws for the spatial distribution and the number of connected components of zero sets of smooth Gaussian random functions of several real variables. The primary examples are various Gaussian ensembles of real-valued polynomials (algebraic or trigonometric) of large degree on the sphere or torus, and translation-invariant smooth Gaussian functions on the Euclidean space restricted to large domains.

Original language	English
Pages (from-to)	205-278
Number of pages	74
Journal	Journal of Mathematical Physics, Analysis, Geometry
Volume	12
Issue number	3
DOIs	https://doi.org/10.15407/mag12.03.205
State	Published - 2016

Keywords

Ergodicity
Smooth Gaussian functions of several real variables
The number of connected components of the zero set

ASJC Scopus subject areas

Analysis
Mathematical Physics
Geometry and Topology

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10.15407/mag12.03.205

Cite this

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abstract = "We study the asymptotic laws for the spatial distribution and the number of connected components of zero sets of smooth Gaussian random functions of several real variables. The primary examples are various Gaussian ensembles of real-valued polynomials (algebraic or trigonometric) of large degree on the sphere or torus, and translation-invariant smooth Gaussian functions on the Euclidean space restricted to large domains.",

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Y1 - 2016

N2 - We study the asymptotic laws for the spatial distribution and the number of connected components of zero sets of smooth Gaussian random functions of several real variables. The primary examples are various Gaussian ensembles of real-valued polynomials (algebraic or trigonometric) of large degree on the sphere or torus, and translation-invariant smooth Gaussian functions on the Euclidean space restricted to large domains.

AB - We study the asymptotic laws for the spatial distribution and the number of connected components of zero sets of smooth Gaussian random functions of several real variables. The primary examples are various Gaussian ensembles of real-valued polynomials (algebraic or trigonometric) of large degree on the sphere or torus, and translation-invariant smooth Gaussian functions on the Euclidean space restricted to large domains.

KW - Ergodicity

KW - Smooth Gaussian functions of several real variables

KW - The number of connected components of the zero set

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DO - 10.15407/mag12.03.205

M3 - مقالة

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JO - Journal of Mathematical Physics, Analysis, Geometry

JF - Journal of Mathematical Physics, Analysis, Geometry

IS - 3

ER -

Asymptotic laws for the spatial distribution and the number of connected components of zero sets of Gaussian random functions

Abstract

Keywords

ASJC Scopus subject areas

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