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On the Asymptotic Behaviour of a Diffusion Process with Singular Drift

Published online by Cambridge University Press:  22 January 2016

Hitoshi Kaneta
Hitoshi Kaneta*
Affiliation:
Nagoya University
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We discuss some peculiar features of the diffusion process whose characterization is given below. Let D be a bounded domain in the d-dimensional Euclidean space Ed with a smooth boundary ∂D. The domain D contains open balls (i = 1, · · ·, n) which are mutually disjoint. Our process is a diffusion process on the state space D ∪ ∂D which is locally equivalent to the Brownian motion except on the spheres and the boundary ∂D. By a diffusion process we mean a continuous strong Markov process. As to the terminology about Markov processes we refer to [2].

Type
Research Article
Information
Nagoya Mathematical Journal , Volume 57 , June 1975 , pp. 87 - 106
Copyright
Copyright © Editorial Board of Nagoya Mathematical Journal 1975

References

[1] Duflo, M. and Revuz, D.: Propriétés asymptotiques des probabilités de transition des processus de Markov récurrents. Ann. Inst. Henri Poincaré, vol. 5, n°3 (1969), 233244.Google Scholar
[2] Dynkin, E. B.: Markov process, Springer-Verlag, Berlin, 1965.Google Scholar
[3] Girsanov, I. V.: Strongly-Feller processes. Theory of Prob. and its Appl., vol. 5 (1960), 524.Google Scholar
[4] Harris, T. E.: The existence of stationary measures for certain Markov processes, Third Berkley Sympo., vol. 1 (1956), 113125.Google Scholar
[5] Ikeda, N., Nagasawa, T. and Watanabe, S.: Branching Markov processes II. J. Math. Kyoto Univ. 83 (1968), 365410.Google Scholar
[6] Ito, K. and Mckean, H. P. Jr.: Diffusion processes and their sample paths, Springer-Verlag, Berlin, 1965.Google Scholar
[7] Maruyama, G. and Tanaka, H.: Some properties of one-dimensional processes. Mem. Fac. Sci. Kyushu Univ. A-11, 2 (1957), 117141.Google Scholar
[8] Orey, S.: Recurrent Markov chains, Pacific J. of Math. 9 (1959), 805827.CrossRefGoogle Scholar
[9] Seminar on Prob. vol. 5 (1960) (Japanese).Google Scholar
[10] Seminar on Prob. vol. 231 (1966) (Japanese).Google Scholar
[11] Sato, K. and Ueno, T.: Multidimensional diffusion process and the Markov process on the boundary. J. Math. Kyoto Univ. 4 (1965), 526606.Google Scholar
[12] Wentzell, A. D.: On boundary conditions for multidimensional diffusion processes. Theory of Prob. and its Appl. vol. 4 (1959), 164177.Google Scholar
[13] Neveu, J.: Bases mathématiques du calcul des probabilités. Paris, Masson et Cie, 1964.Google Scholar