In inverse problem for trigonometric polynomials: Does the distribution of a homogeneous polynomial in a Gaussian random point define the polynomial?

Yuliy M. Baryshnikov; Wolfgang Stadje

doi:10.1006/aama.1994.1012

In inverse problem for trigonometric polynomials: Does the distribution of a homogeneous polynomial in a Gaussian random point define the polynomial?

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Abstract

It is shown that the probability distribution of the value of a homogeneous polynomial in two Gaussian variables determines the polynomial up to some explicitly described ambiguity, if the degree of the polynomial is five or less, or for generic polynomials of arbitrary degree.

Original language	English (US)
Pages (from-to)	336-359
Number of pages	24
Journal	Advances in Applied Mathematics
Volume	15
Issue number	3
DOIs	https://doi.org/10.1006/aama.1994.1012
State	Published - Sep 1994
Externally published	Yes

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Applied Mathematics

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10.1006/aama.1994.1012

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title = "In inverse problem for trigonometric polynomials: Does the distribution of a homogeneous polynomial in a Gaussian random point define the polynomial?",

abstract = "It is shown that the probability distribution of the value of a homogeneous polynomial in two Gaussian variables determines the polynomial up to some explicitly described ambiguity, if the degree of the polynomial is five or less, or for generic polynomials of arbitrary degree.",

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In inverse problem for trigonometric polynomials: Does the distribution of a homogeneous polynomial in a Gaussian random point define the polynomial?

Abstract

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