Hostname: page-component-848d4c4894-p2v8j Total loading time: 0.001 Render date: 2024-05-22T06:08:54.356Z Has data issue: false hasContentIssue false
  • English
  • Français

Quasi-homeomorphisms of Dirichlet forms

Published online by Cambridge University Press:  22 January 2016

Zhen-Qing Chen ,
Zhi-Ming Ma  and
Michael Röckner
Zhen-Qing Chen
Affiliation:
Department of Mathematics, University of California at, San Diege, La folla, CA 92093, USA
Zhi-Ming Ma
Affiliation:
Institute of Applied Mathematics, Academia Sinica, 100090 Beijing, China
Michael Röckner
Affiliation:
Faculty of Mathematics, University of Bielefeld, D-33501 Bielefeld, Germany
Rights & Permissions [Opens in a new window]

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

Extending fundamental work of M. Fukushima, M. L. Silverstein, S. Carrillo Menendez, and Y. Le Jan (cf. [F71a, 80], [Si74], [Ca-Me75], [Le77]) it was recently discovered that there is a one-to-one correspondence between (equivalent classes of) all pairs of sectorial right processes and quasi-regular Dirichlet forms (see [AM91], [AM92], [AMR90], [AMR92a], [AMR92b], [MR92]). Based on the potential theory for quasi-regular Dirichlet forms, it was shown that any quasi-regular Dirichlet form on a general state space can be considered as a regular Dirichlet form on a locally compact separable metric space by “local compactification”. There are several ways to implement this local compactification. One relies on h-transformation which was mentioned in [AMR90, Remark 1.4]. A direct way using a modified Ray-Knight compactification was announced on the “5th French-German meeting: Bielefeld Encounters in Mathematics and Physics IX. Dynamics in Complex and Irregular Systems”, Bielefeld, December 16 to 21, 1991, and the “Third European Symposium on Analysis and Probability”, Paris, January 3-10, 1992, and appeared in [MR92, Chap. VI] and [AMR92b] (see also the proof of Theorem 3.7 below). One can also do this by Gelfand-transform. This way was found by the first named author independetly and announced in the “12th Seminar on Stochastic Processes”, Seattle, March 26-28, 1992. It will be discussed in Section 4.

Type
Research Article
Information
Nagoya Mathematical Journal , Volume 136 , December 1994 , pp. 1 - 15
Copyright
Copyright © Editorial Board of Nagoya Mathematical Journal 1994

References

[AM91] Albeverio, S., Ma, Z. M., Necessary and sufficient condition for the existence of m-perfect processes associated with Dirichlet forms, In: Seminaire de Probabilités XXV, Lecture Notes in Math., 1485, 374406, Berlin: Springer 1991.Google Scholar
[AM92] Albeverio, S., Ma, Z. M., A general correspondence between Dirichlet forms and right processes, Bull. Amer. Math. Soc., 26 (1991), 245252.Google Scholar
[AMR90] Albeverio, S., Ma, Z. M., Röckner, M., A Beurling-Deny type structure theorem for Dirichlet forms on general state space, Preprint (1990), In: Memorial Volume for R. Høegh-Krohn, Vol. I. Ideas and methods in mathematical analysis, stochastics and applications, Ed. Albeverio, S., Fenstad, J. E., Holden, H., Lindstrøm, T.. Cambridge: Cambridge University Press (1992).Google Scholar
[AMR92a] Albeverio, S., Ma, Z. M., Röckner, M., Non-symmetric Dirichlet forms and Markov processes on general state space, C. R. Acad. Sci. Paris, t. 314 Série I (1992), 7782.Google Scholar
[AMR92b] Albeverio, S., Ma, Z. M., Röckner, M., Regularization of Dirichlet spaces and applications, C. R. Acad. Sci. Paris, t. 314, Série I (1992), 859864.Google Scholar
[AMR93] Albeverio, S., Ma, Z. M., Röckner, M., Quasi-regular Dirichlet forms and Markov processes, J. Funct. Anal., 111 (1993), 118154.Google Scholar
[Ca-Me75] Carrillo Menendez, S., Processus de Markov associé à une forme de Dirichlet non symétrique, Z. Wahrsch. verw. Geb., 33 (1975), 139154.Google Scholar
[F71a] Fukushima, M., Dirichlet spaces and strong Markov processes, Trans. Amer. Math. Soc., 162 (1971), 185224.Google Scholar
[F71b] Fukushima, M., Regular representations of Dirichlet forms, Amer. Math. Soc., 155 (1971), 455473.Google Scholar
[F80] Fukushima, M., Dirichlet forms and Markov processes, Amsterdam-Oxford-New York: North Holland (1980).Google Scholar
[Le77] LeJan, Y., Balayage et formes de Dirichlet, Z. Wahrsch. verw. Geb., 37 (1977), 297319.Google Scholar
[MR92] Ma, Z. M., Röckner, M., An introduction to the theory of (non-symmetric) Dirichlet forms, Berlin: Springer 1992.Google Scholar
[Si74] Silverstein, M. L., Symmetric Markov Processes, Lecture Notes in Math., 426, Berlin-Heidelberg-New York: Springer 1974.Google Scholar