G. L. Kulinič, “On necessary and sufficient conditions for the convergence of solutions of one-dimensional diffusion stochastic equations with a non-regular dependence of coefficients on a parameter”, Teor. Veroyatnost. i Primenen., 27:4 (1982), 795–802; Theory Probab. Appl., 27:4 (1983), 856

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Teoriya Veroyatnostei i ee Primeneniya, 1982, Volume 27, Issue 4, Pages 795–802 (Mi tvp2437)

This article is cited in 8 scientific papers (total in 8 papers)

Short Communications

On necessary and sufficient conditions for the convergence of solutions of one-dimensional diffusion stochastic equations with a non-regular dependence of coefficients on a parameter

G. L. Kulinič

Kiev

Full-text PDF (519 kB) Citations (8)

Abstract: We consider an one-dimensional stochastic differential equation of diffusion type

$d\xi_\alpha(t)=a_\alpha(\xi_\alpha(t))\,dt+\sigma_\alpha(\xi_\alpha(t))\,dw_\alpha(t),\qquad t>0.$
where

$\alpha>0$ is a parameter,

$a_\alpha(x)$ ,

$\sigma_\alpha(x)>0$ are real functions which may degenerate at some points

$x_k$ as

$\alpha\to 0$ and

$w_\alpha(t)$ is a family of Wiener processes. The necessary and sufficient conditions for the weak convergence of

$\xi_\alpha(t)$ to the generalized diffusion process

$\alpha\to 0$ are obtained.

Received: 01.04.1980

English version:
Theory of Probability and its Applications, 1983, Volume 27, Issue 4, Pages 856–862
DOI: https://doi.org/10.1137/1127096

Bibliographic databases:

Document Type: Article

Language: Russian

Citation: G. L. Kulinič, “On necessary and sufficient conditions for the convergence of solutions of one-dimensional diffusion stochastic equations with a non-regular dependence of coefficients on a parameter”, Teor. Veroyatnost. i Primenen., 27:4 (1982), 795–802; Theory Probab. Appl., 27:4 (1983), 856–862

Citation in format AMSBIB

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\paper On necessary and sufficient conditions for the convergence of solutions of one-dimensional diffusion stochastic equations with a~non-regular dependence of coefficients on a~parameter

\jour Teor. Veroyatnost. i Primenen.

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\vol 27

\issue 4

\pages 795--802

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\zmath{https://zbmath.org/?q=an:0522.60059|0498.60063}

\transl

\jour Theory Probab. Appl.

\yr 1983

\vol 27

\issue 4

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Linking options:

https://www.mathnet.ru/eng/tvp2437

https://www.mathnet.ru/eng/tvp/v27/i4/p795

This publication is cited in the following 8 articles:

Ivan H. Krykun, “On weak convergence of stochastic differential equations with irregular coefficients”, J Math Sci, 273:3 (2023), 398
Ivan Krykun, “On weak convergence of stochastic differential equations with irregular coefficients”, UMB, 20:1 (2023), 87
O. D. Borysenko, S. V. Kushnirenko, Yu. S. Mishura, M. P. Moklyachuk, M. O. Perestyuk, V. G. Samoilenko, O. M. Stanzhytskyi, I. O. Shevchuk, “Professor G.L. Kulinich (09.12.1938 – 10.02.2022) – prominent scientist and teacher”, BKNUPhM, 2022, no. 3, 11
Wagner A.B. Shende N.V. Altug Yu., “A New Method For Employing Feedback to Improve Coding Performance”, IEEE Trans. Inf. Theory, 66:11 (2020), 6660–6681
Grigorij Kulinich, Svitlana Kushnirenko, Yuliya Mishura, Bocconi & Springer Series, 9, Asymptotic Analysis of Unstable Solutions of Stochastic Differential Equations, 2020, 15
Grigorij Kulinich, Svitlana Kushnirenko, Yuliya Mishura, Bocconi & Springer Series, 9, Asymptotic Analysis of Unstable Solutions of Stochastic Differential Equations, 2020, 1
S. Ya. Makhno, “Convergence of solutions of one-dimensional stochastic equations”, Theory Probab. Appl., 44:3 (2000), 595–510
Y. Ouknine, “Le «Skew-Brownian Motion» et les processus qui en dérivent”, Theory Probab. Appl., 35:1 (1990), 163–169

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

Theory of Probability and its Applications

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