On the Euclidean distance between two Gaussian points and the normal covariogram of \(\mathbb{R}^d\)
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Publication:6602405
DOI10.3103/s1068362324010059zbMATH Open1548.60042MaRDI QIDQ6602405
Viktor Ohanyan, Davit Martirosyan
Publication date: 11 September 2024
Published in: Journal of Contemporary Mathematical Analysis. Armenian Academy of Sciences (Search for Journal in Brave)
integral representationcovariance matrixmultivariate normal distributioncovariogrammoment estimationinterpoint distance
Geometric probability and stochastic geometry (60D05) Probability distributions: general theory (60E05) Integral geometry (53C65) Random convex sets and integral geometry (aspects of convex geometry) (52A22)
Cites Work
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- Random points associated with rectangles
- Distribution of the distance between two random points in a body from \(\mathbb{R}^n\)
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- Concerning $\int_0^1 \cdots \int_0^1 {(x_1^2 + \cdots + x_k^2 )} ^{{1 / 2}} dx_1 \cdots ,dx_k $ and a Taylor Series Method
- A Generalization of the Gamma Distribution
- RELATION BETWEEN THE COVARIOGRAM AND DISTRIBUTION FUNCTION OF THE DISTANCE BETWEEN TWO UNIFORM AND INDEPENDENT POINTS
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