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Zapiski Nauchnykh Seminarov POMI, 2018, Volume 474, Pages 63–76 (Mi znsl6668)  

A new convexity-based inequality, characterization of probability distributions and some free-of-distribution tests

I. V. Volchenkovaab, L. B. Klebanovab

a Czech Technical University
b Charles University
References:
Abstract: In this article we will define new inequalities, connecting some functionals of probability distribution functions. These inequalities are based on the strict convexity of functions that are used in functional definition.
The starting point of of this article is the work “Cramér–von Mises distance: probabilistic interpretation, confidence intervals and neighbourhood of model validation” by Ludwig Baringhaus and Norbert Henze. In our article we provide a generalization of inequality obtained in probabilistic interpretation of the Cramér–von Mises distance. If equality holds there appears a chance to give characterization of some probability distribution functions. Considering this fact and a special character of functional, it is possible to create a class of free-of-distribution two sample tests.
Key words and phrases: convex functions, probability distances, characterization of distribution, one-dimensional statistical tests, multi-dimensional statistical tests, Cramér–von Mises distance.
Funding agency Grant number
Czech Science Foundation 16-03708S
Received: 02.10.2018
Document Type: Article
UDC: 519.2
Language: Russian
Citation: I. V. Volchenkova, L. B. Klebanov, “A new convexity-based inequality, characterization of probability distributions and some free-of-distribution tests”, Probability and statistics. Part 27, Zap. Nauchn. Sem. POMI, 474, POMI, St. Petersburg, 2018, 63–76
Citation in format AMSBIB
\Bibitem{VolKle18}
\by I.~V.~Volchenkova, L.~B.~Klebanov
\paper A new convexity-based inequality, characterization of probability distributions and some free-of-distribution tests
\inbook Probability and statistics. Part~27
\serial Zap. Nauchn. Sem. POMI
\yr 2018
\vol 474
\pages 63--76
\publ POMI
\publaddr St.~Petersburg
\mathnet{http://mi.mathnet.ru/znsl6668}
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  • https://www.mathnet.ru/eng/znsl/v474/p63
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