Uchenyye zapiski UlGU. Seriya "Matematika i informatsionnyye tekhnologii"
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Uchenyye zapiski UlGU. Seriya "Matematika i informatsionnyye tekhnologii", 2020, Issue 2, Pages 7–12 (Mi ulsu7)  
Distribution approximation in multi-stage aging models

A. A. Butov, O. A. Lavrova

Ulyanovsk State University, Ulyanovsk, Russia
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Abstract: The paper considers the main provisions of the theory of wear in terms of the Gompertz function and its generalization, as well as in martingale terms. Models of simulation computer modeling and their behavior with various parameters are presented. The basic formulas used to build models and the constraints necessary for them are given.
Keywords: mathematical modeling, simulation, martingale, compensator, intensity, survival function, wear, random environment.
Received: 19.05.2020
Revised: 06.11.2020
Accepted: 19.12.2020
Document Type: Article
UDC: 519.87 + 004.9 + 573.2
Language: Russian
Citation: A. A. Butov, O. A. Lavrova, “Distribution approximation in multi-stage aging models”, Uchenyye zapiski UlGU. Seriya “Matematika i informatsionnyye tekhnologii”, 2020, no. 2, 7–12
Citation in format AMSBIB
\Bibitem{ButLav20}
\by A.~A.~Butov, O.~A.~Lavrova
\paper Distribution approximation in multi-stage aging models
\jour Uchenyye zapiski UlGU. Seriya ``Matematika i informatsionnyye tekhnologii''
\yr 2020
\issue 2
\pages 7--12
\mathnet{http://mi.mathnet.ru/ulsu7}
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