关于高斯乘积不等式的新结果 (I)

Acta mathematica scientia,Series A ›› 2025, Vol. 45 ›› Issue (3): 960-971.

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New Results On Gauss Product Inequalities (I)

Ma Li^1,²(),Chen Pengying¹(),Han Xinfang^1,^2,^*()

¹Department of Mathematics and Statistics, Hainan Normal University, Haikou 571158
²Key Laboratory of Data Science and Intelligence Education (Hainan Normal University), Ministry of Education, Haikou 571158

Received:2024-05-07 Revised:2025-01-13 Online:2025-06-26 Published:2025-06-20
Supported by:
Hainan Provincial Natural Science Foundation(122MS056);Hainan Provincial Natural Science Foundation(124MS056)

Abstract

Abstract:

Let ($X_1$,$X_2$,$X_3$) be a centered Gaussian random vector with $D(X_i)=1$, $i=1,2,3$. By means of the properties of hypergeometric function and factorization, we prove that

$E\big[|X_1^4X_2^3X_3^3|\big]\geq$E$|X_1^4|$E$|X_2^3|$E$|X_3^3|$,

and the equal sign holds if and only if $X_1$,$X_2$,$X_3$ are independent. This complements the results of the three dimensional Gauss product inequality in the existing literature.

Key words: Gauss Product Inequality, normal Distribution, hypergeometric Function, factorization

CLC Number:

O177.2

Ma Li, Chen Pengying, Han Xinfang. New Results On Gauss Product Inequalities (I)[J].Acta mathematica scientia,Series A, 2025, 45(3): 960-971.

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New Results On Gauss Product Inequalities (I)

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