Multidimensional symmetric stable processes

Zhen Qing Chen

doi:10.1007/bf03014372

Multidimensional symmetric stable processes

Zhen Qing Chen^*

^*Corresponding author for this work

University of Washington

Research output: Contribution to journal › Review article › peer-review

31 Citations (Scopus)

Abstract

This paper surveys recent remarkable progress in the study of potential theory for symmetric stable processes. It also contains new results on the two-sided estimates for Green functions, Poisson kernels and Martin kernels of discontinuous symmetric α- stable process in bounded C1,1 open sets. The new results give explicit information on how the comparing constants depend on parameter α and consequently recover the Green function and Poisson kernel estimates for Brownian motion by passing α ↑ 2. In addition to these new estimates, this paper surveys recent progress in the study of notions of harmonicity, integral representation of harmonic functions, boundary Harnack inequality, conditional gauge and intrinsic ultracontractivity for symmetric stable processes. Here is a table of contents.

Original language	English
Pages (from-to)	227-266
Number of pages	40
Journal	Journal of Applied Mathematics and Computing
Volume	6
Issue number	2
DOIs	https://doi.org/10.1007/bf03014372
Publication status	Published - May 1999
Externally published	Yes

Keywords

And intrinsic ultracontractivity
Boundary Harnack principle
Conditional gauge theorem
Feynman-Kac semigroup
Green function
Integral representation of harmonic functions
Logarithmic Sobolev inequality
Martin boundary
Martin kernel
Poisson kernel
Symmetric stable processes

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10.1007/bf03014372

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Chen, Z. Q. (1999). Multidimensional symmetric stable processes. Journal of Applied Mathematics and Computing, 6(2), 227-266. https://doi.org/10.1007/bf03014372

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abstract = "This paper surveys recent remarkable progress in the study of potential theory for symmetric stable processes. It also contains new results on the two-sided estimates for Green functions, Poisson kernels and Martin kernels of discontinuous symmetric α- stable process in bounded C1,1 open sets. The new results give explicit information on how the comparing constants depend on parameter α and consequently recover the Green function and Poisson kernel estimates for Brownian motion by passing α ↑ 2. In addition to these new estimates, this paper surveys recent progress in the study of notions of harmonicity, integral representation of harmonic functions, boundary Harnack inequality, conditional gauge and intrinsic ultracontractivity for symmetric stable processes. Here is a table of contents.",

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year = "1999",

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doi = "10.1007/bf03014372",

language = "English",

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journal = "Journal of Applied Mathematics and Computing",

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AB - This paper surveys recent remarkable progress in the study of potential theory for symmetric stable processes. It also contains new results on the two-sided estimates for Green functions, Poisson kernels and Martin kernels of discontinuous symmetric α- stable process in bounded C1,1 open sets. The new results give explicit information on how the comparing constants depend on parameter α and consequently recover the Green function and Poisson kernel estimates for Brownian motion by passing α ↑ 2. In addition to these new estimates, this paper surveys recent progress in the study of notions of harmonicity, integral representation of harmonic functions, boundary Harnack inequality, conditional gauge and intrinsic ultracontractivity for symmetric stable processes. Here is a table of contents.

KW - And intrinsic ultracontractivity

KW - Boundary Harnack principle

KW - Conditional gauge theorem

KW - Feynman-Kac semigroup

KW - Green function

KW - Integral representation of harmonic functions

KW - Logarithmic Sobolev inequality

KW - Martin boundary

KW - Martin kernel

KW - Poisson kernel

KW - Symmetric stable processes

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DO - 10.1007/bf03014372

M3 - Review article

AN - SCOPUS:0000424092

SN - 1598-5865

VL - 6

SP - 227

EP - 266

JO - Journal of Applied Mathematics and Computing

JF - Journal of Applied Mathematics and Computing

IS - 2

ER -

Multidimensional symmetric stable processes

Abstract

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