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242 results on '"Vondraček, Zoran"'

1. Markov processes with jump kernels decaying at the boundary

Author

Cho, Soobin, Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, Mathematics - Analysis of PDEs, 60Jxx, 60J45, 31C25, 35J08, 47G20, 60J46, 60J50, 60J76
Abstract

The goal of this work is to develop a general theory for non-local singular operators of the type $$ L^{\mathcal{B}}_{\alpha}f(x)=\lim_{\epsilon\to 0} \int_{D,\, |y-x|>\epsilon}\big(f(y)-f(x)\big) \mathcal{B}(x,y)|x-y|^{-d-\alpha}\,dy, $$ and $$ L f(x)=L^{\mathcal{B}}_{\alpha}f(x) - \kappa(x) f(x), $$ in case $D$ is a $C^{1,1}$ open set in $\mathbb{R}^d$, $d\ge 2$. The function $\mathcal{B}(x,y)$ above may vanish at the boundary of $D$, and the killing potential $\kappa$ may be subcritical or critical. From a probabilistic point of view we study the reflected process on the closure $\overline{D}$ with infinitesimal generator $L^{\mathcal{B}}_{\alpha}$, and its part process on $D$ obtained by either killing at the boundary $\partial D$, or by killing via the killing potential $\kappa(x)$. The general theory developed in this work (i) contains subordinate killed stable processes in $C^{1,1}$ open sets as a special case, (ii) covers the case when $\mathcal{B}(x,y)$ is bounded between two positive constants and is well approximated by certain H\"older continuous functions, and (iii) extends the main results known for the half-space in $\mathbb{R}^d$. The main results of the work are the boundary Harnack principle and its possible failure, and sharp two-sided Green function estimates. Our results on the boundary Harnack principle completely cover the corresponding earlier results in the case of half-space. Our Green function estimates extend the corresponding earlier estimates in the case of half-space to bounded $C^{1, 1}$ open sets., Comment: 123 pages

Published
2024

2. Heat kernel estimates for Dirichlet forms degenerate at the boundary

Author

Cho, Soobin, Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, Mathematics - Analysis of PDEs, 60J35, 60J45
Abstract

The goal of this paper is to prove the existence of heat kernels for two types of purely discontinuous symmetric Markov processes in the upper half-space of $\mathbb R^d$ with jump kernels degenerate at the boundary, and to establish sharp two-sided estimates on the heat kernels. The jump kernels are of the form $J(x,y)=\mathcal B(x,y)|x-y|^{-\alpha-d}$, $\alpha\in (0,2)$, where the function $\mathcal B$ depends on four parameters and may vanish at the boundary. Our results are the first sharp two-sided estimates for the heat kernels of non-local operators with jump kernels degenerate at the boundary. The first type of processes we consider are conservative Markov processes on the closed half-space with jump kernel $J(x,y)$. Depending on the regions where the parameters belong, the heat kernels estimates have three different forms, two of them are qualitatively different from all previously known heat kernel estimates. The second type of processes we consider are the processes above killed either by a critical potential or upon hitting the boundary of the half-space. We establish that their heat kernel estimates have the approximate factorization property with survival probabilities decaying as a power of the distance to the boundary, where the power depends on the constant in the critical potential. Finally, by using the heat kernel estimates, we obtain sharp two-sided Green function estimates that cover the main result of [31]. This alternative proof provides an explanation of the anomalous form of the estimates., Comment: 61 pages, 1 figure

Published
2022

3. Potential theory of Dirichlet forms with jump kernels blowing up at the boundary

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, Mathematics - Analysis of PDEs, 60J45
Abstract

In this paper we study the potential theory of Dirichlet forms on the half-space $\mathbb{R}^d_+$ defined by the jump kernel $J(x,y)=|x-y|^{-d-\alpha}\mathcal{B}(x,y)$ and the killing potential $\kappa x_d^{-\alpha}$, where $\alpha\in (0, 2)$ and $\mathcal{B}(x,y)$ can blow up to infinity at the boundary. The jump kernel and the killing potential depend on several parameters. For all admissible values of the parameters involved and all $d \ge 1$, we prove that the boundary Harnack principle holds, and establish sharp two-sided estimates on the Green functions of these processes., Comment: 63 pages

Published
2022

4. Harnack inequality and interior regularity for Markov processes with degenerate jump kernels

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, Mathematics - Analysis of PDEs, 60J45
Abstract

In this paper we study interior potential-theoretic properties of purely discontinuous Markov processes in proper open subsets $D\subset \mathbb{R}^d$. The jump kernels of the processes may be degenerate at the boundary in the sense that they may vanish or blow up at the boundary. Under certain natural conditions on the jump kernel, we show that the scale invariant Harnack inequality holds for any proper open subset $D\subset \mathbb{R}^d$ and prove some interior regularity of harmonic functions. We also prove a Dynkin-type formula and several other interior results., Comment: 33 pages; minor changes. arXiv admin note: text overlap with arXiv:1910.10961

Published
2022

5. Positive self-similar Markov processes obtained by resurrection

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 60G18
Abstract

In this paper we study positive self-similar Markov processes obtained by (partially) resurrecting a strictly $\alpha$-stable process at its first exit time from $(0,\infty)$. We construct those processes by using the Lamperti transform. We explain their long term behavior and give conditions for absorption at 0 in finite time. In case the process is absorbed at 0 in finite time, we give a necessary and sufficient condition for the existence of a recurrent extension. The motivation to study resurrected processes comes from the fact that their jump kernels may explode at zero. We establish sharp two-sided jump kernel estimates for a large class of resurrected stable processes., Comment: Several typos corrected

Published
2022

7. Potential theory of Dirichlet forms degenerate at the boundary: the case of no killing potential

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 60J45, 60J50, 60J76
Abstract

In this paper we consider the Dirichlet form on the half-space $\mathbb{R}^d_+$ defined by the jump kernel $J(x,y)=|x-y|^{-d-\alpha}\mathcal{B}(x,y)$, where $\mathcal{B}(x,y)$ can be degenerate at the boundary. Unlike our previous works [6,7] where we imposed critical killing, here we assume that the killing potential is identically zero. In case $\alpha\in (1,2)$ we first show that the corresponding Hunt process has finite lifetime and dies at the boundary. Then, as our main contribution, we prove the boundary Harnack principle and establish sharp two-sided Green function estimates. Our results cover the case of the censored $\alpha$-stable process, $\alpha\in (1,2)$, in the half-space studied in [2]., Comment: A small gap in the proof of Lemma 4.3 fixed. arXiv admin note: text overlap with arXiv:1910.10961

Published
2021

8. Heat kernel estimates for subordinate Markov processes and their applications

Author

Cho, Soobin, Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, Mathematics - Analysis of PDEs, 60J35, 60J50, 60J76
Abstract

In this paper, we establish sharp two-sided estimates for transition densities of a large class of subordinate Markov processes. As applications, we show that the parabolic Harnack inequality and H\"older regularity hold for parabolic functions of such processes, and derive sharp two-sided Green function estimates., Comment: 43 pages : Some heat kernel estimates are written in different forms

Published
2021

9. Sharp two-sided Green function estimates for Dirichlet forms degenerate at the boundary

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 60J45, 60J50, 60J76
Abstract

In this paper we continue our investigation of the potential theory of Markov processes with jump kernels decaying at the boundary. To be more precise, we consider processes in ${\mathbb R}^d_+$ with jump kernels of the form ${\mathcal B}(x,y) |x-y|^{-d-\alpha}$ and killing potentials $\kappa(x)=cx_d^{-\alpha}$, $0<\alpha<2$. The boundary part ${\mathcal B}(x,y)$ is comparable to the product of three terms with parameters $\beta_1, \beta_2$, $\beta_3$ and $\beta_4$ appearing as exponents in these terms. The constant $c$ in the killing term can be written as a function of $\alpha$, ${\mathcal B}$ and a parameter $p\in ((\alpha-1)_+, \alpha+\beta_1)$, which is strictly increasing in $p,$ decreasing to $0$ as $p\downarrow (\alpha-1)_+$ and increasing to $\infty$ as $p\uparrow\alpha+\beta_1$. We establish sharp two-sided estimates on the Green functions of these processes for all $p\in ((\alpha-1)_+, \alpha+\beta_1)$ and all admissible values of $\beta_1, \beta_2$, $\beta_3$ and $\beta_4$. Depending on the regions where $\beta_1$, $\beta_2$ and $p$ belong, the estimates on the Green functions are different. In fact, the estimates have three different forms depending on the regions the parameters belong to. As applications, we prove that the boundary Harnack principle holds in certain region of the parameters and fails in some other region of the parameters. Combined with the main results of \cite{KSV},we completely determine the region of the parameters where the boundary Harnack principle holds., Comment: Two typos corrected

Published
2020

10. Semilinear equations for non-local operators: beyond the fractional Laplacian

Author

Biočić, Ivan, Vondraček, Zoran, and Wagner, Vanja

Subjects
Mathematics - Analysis of PDEs, Mathematics - Probability
Abstract

We study semilinear problems in general bounded open sets for non-local operators with exterior and boundary conditions. The operators are more general than the fractional Laplacian. We also give results in case of bounded $C^{1,1}$ open sets.

Published
2020

12. A probabilistic approach to a non-local quadratic form and its connection to the Neumann boundary condition problem

Author

Vondraček, Zoran

Subjects
Mathematics - Probability, 60J75, 31C25, 47G20, 60J45, 60J50
Abstract

In this paper, we look at a probabilistic approach to a non-local quadratic form that has lately attracted some interest. This form is related to a recently introduced non-local normal derivative. The goal is to construct two Markov process: one corresponding to that form and the other which is related to a probabilistic interpretation of the Neuman problem. We also study the Dirichlet-to-Neumann operator for non-local operators., Comment: 21 pages

Published
2019

14. Factorization and estimates of Dirichlet heat kernels for non-local operators with critical killings

Author

Cho, Soobin, Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 60J35, 60J50, 60J75
Abstract

In this paper we discuss non-local operators with killing potentials, which may not be in the standard Kato class. We first discuss factorization of their Dirichlet heat kernels in metric measure spaces. Then we establish explicit estimates of the Dirichlet heat kernels under critical killings in $C^{1,1}$ open subsets of $\mathbb{R}^d$ or in $\mathbb{R}^d\setminus\{0\}$. The decay rates of our explicit estimates come from the values of the multiplicative constants in the killing potentials. Our method also provides an alternative and unified proof of the main results of \cite{CKS10a, CKS10b, CKS-AOP}., Comment: 51 pages, 2 figures. To appear in Journal de Math\'ematiques Pures et Appliqu\'ees

Published
2018

15. On the boundary theory of subordinate killed L\'evy processes

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 60J45
Abstract

Let $Z$ be a subordinate Brownian motion in ${\mathbb R}^d$, $d\ge 2$, via a subordinator with Laplace exponent $\phi$. We kill the process $Z$ upon exiting a bounded open set $D\subset {\mathbb R}^d$ to obtain the killed process $Z^D$, and then we subordinate the process $Z^D$ by a subordinator with Laplace exponent $\psi$. The resulting process is denoted by $Y^D$. Both $\phi$ and $\psi$ are assumed to satisfy certain weak scaling conditions at infinity. We study the potential theory of $Y^D$, in particular the boundary theory. First, in case that $D$ is a $\kappa$-fat bounded open set, we show that the Harnack inequality holds. If, in addition, $D$ satisfies the local exterior volume condition, then we prove the Carleson estimate. In case $D$ is a smooth open set and the lower weak scaling index of $\psi$ is strictly larger than $1/2$, we establish the boundary Harnack principle with explicit decay rate near the boundary of $D$. On the other hand, when $\psi(\lambda)=\lambda^{\gamma}$ with $\gamma\in (0,1/2]$, we show that the boundary Harnack principle near the boundary of $D$ fails for any bounded $C^{1,1}$ open set $D$. Our results give the first example where the Carleson estimate holds true, but the boundary Harnack principle does not. One of the main ingredients in the proofs is the sharp two-sided estimates of the Green function of $Y^D$. Under an additional condition on $\psi$, we establish sharp two-sided estimates of the jumping kernel of $Y^D$ which exhibit some unexpected boundary behavior. We also prove a boundary Harnack principle for non-negative functions harmonic in a smooth open set $E$ strictly contained in $D$, showing that the behavior of $Y^D$ in the interior of $D$ is determined by the composition $\psi\circ \phi$., Comment: A few typos corrected. Accepted for publication in Potential Analysis (55 pp). arXiv admin note: text overlap with arXiv:1610.00872

Published
2017

17. On purely discontinuous additive functionals of subordinate Brownian motions

Author

Vondraček, Zoran and Wagner, Vanja

Subjects
Mathematics - Probability
Abstract

Let $A_t=\sum_{s\le t} F(X_{s-},X_s)$ be a purely discontinuous additive functional of a subordinate Brownian motion $X=(X_t, \mathbb P_x)$. We give a sufficient condition on the non-negative function $F$ that guarantees that finiteness of $A_{\infty}$ implies finiteness of its expectation. This result is then applied to study the relative entropy of $\mathbb P_x$ and the probability measure induced by a purely discontinuous Girsanov transform of the process $X$. We prove these results under the weak global scaling condition on the Laplace exponent of the underlying subordinator., Comment: arXiv admin note: text overlap with arXiv:1403.7364

Published
2016

18. Potential theory of subordinate killed Brownian motion

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 60J45, 60J50, 60J75
Abstract

Let $W^D$ be a killed Brownian motion in a domain $D\subset {\mathbb R}^d$ and $S$ an independent subordinator with Laplace exponent $\phi$. The process $Y^D$ defined by $Y^D_t=W^D_{S_t}$ is called a subordinate killed Brownian motion. It is a Hunt process with infinitesimal generator $-\phi(-\Delta|_D)$, where $\Delta|_D$ is the Dirichlet Laplacian. In this paper we study the potential theory of $Y^D$ under a weak scaling condition on the derivative of $\phi$. We first show that non-negative harmonic functions of $Y^D$ satisfy the scale invariant Harnack inequality. Subsequently we prove two types of scale invariant boundary Harnack principles with explicit decay rates for non-negative harmonic functions of $Y^D$. The first boundary Harnack principle deals with a $C^{1,1}$ domain $D$ and non-negative functions which are harmonic near the boundary of $D$, while the second one is for a more general domain $D$ and non-negative functions which are harmonic near the boundary of an interior open subset of $D$. The obtained decay rates are not the same, reflecting different boundary and interior behaviors of $Y^D$., Comment: A few typos corrected

Published
2016

19. Heat kernels of non-symmetric jump processes: beyond the stable case

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 60J35
Abstract

Let $J$ be the L\'evy density of a symmetric L\'evy process in $\mathbb{R}^d$ with its L\'evy exponent satisfying a weak lower scaling condition at infinity. Consider the non-symmetric and non-local operator $$ {\mathcal L}^{\kappa}f(x):= \lim_{\epsilon \downarrow 0} \int_{\{z \in \mathbb{R}^d: |z|>\epsilon\}}(f(x+z)-f(x))\kappa(x,z)J(z)\, dz\, , $$ where $\kappa(x,z)$ is a Borel measurable function on $\mathbb{R}^d\times \mathbb{R}^d$ satisfying $0<\kappa_0\le \kappa(x,z)\le \kappa_1$, $\kappa(x,z)=\kappa(x,-z)$ and $|\kappa(x,z)-\kappa(y,z)|\le \kappa_2|x-y|^{\beta}$ for some $\beta\in (0, 1)$. We construct the heat kernel $p^\kappa(t, x, y)$ of ${\mathcal L}^\kappa$, establish its upper bound as well as its fractional derivative and gradient estimates. Under an additional weak upper scaling condition at infinity, we also establish a lower bound for the heat kernel $p^\kappa$., Comment: Gradient estimate improved, several errors corrected; 57 pages

Published
2016

20. Minimal thinness with respect to subordinate killed Brownian motions

Author

Kim, Panki, Song, Renming, and Vondracek, Zoran

Subjects
Mathematics - Probability, 60J50, 31C40, 31C35, 60J45, 60J75
Abstract

Minimal thinness is a notion that describes the smallness of a set at a boundary point. In this paper, we provide tests for minimal thinness for a large class of subordinate killed Brownian motions in bounded C1,1 domains, C1,1 domains with compact complements and domains above graphs of bounded C1,1 functions., Comment: 37 pages. arXiv admin note: text overlap with arXiv:1405.0297

Published
2015

22. Martin boundary for some symmetric L\'evy processes

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 60J50, 31C40, 31C35, 60J45, 60J75
Abstract

In this paper we study the Martin boundary of open sets with respect to a large class of purely discontinuous symmetric L\'evy processes in ${\mathbb R}^d$. We show that, if $D\subset {\mathbb R}^d$ is an open set which is $\kappa$-fat at a boundary point $Q\in \partial D$, then there is exactly one Martin boundary point associated with $Q$ and this Martin boundary point is minimal., Comment: 36 pages

Published
2014

23. Minimal thinness with respect to symmetric L\'evy processes

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 60J50, 31C40, 31C35, 60J45, 60J75
Abstract

Minimal thinness is a notion that describes the smallness of a set at a boundary point. In this paper, we provide tests for minimal thinness at finite and infinite minimal Martin boundary points for a large class of purely discontinuous symmetric L\'evy processes., Comment: 34 pages

Published
2014

24. Absolute continuity and singularity of probability measures induced by a purely discontinuous Girsanov transform of a stable process

Author

Schilling, René L. and Vondraček, Zoran

Subjects
Mathematics - Probability, 60J55, 60G52, 60J45, 60H10
Abstract

In this paper we study mutual absolute continuity and singularity of probability measures on the path space which are induced by an isotropic stable L\'evy process and the purely discontinuous Girsanov transform of this process. We also look at the problem of finiteness of the relative entropy of these measures. An important tool in the paper is the question under which circumstances the a.s. finiteness of an additive functional at infinity implies the finiteness of its expected value., Comment: 30 pages; Lemma 3.3. and several typos corrected

Published
2014

25. A distributional equality for suprema of spectrally positive L\'evy processes

Author

Tudjen, Ivana Geček and Vondraček, Zoran

Subjects
Mathematics - Probability, 60G51, 60J75
Abstract

Let $Y$ be a spectrally positive L\'evy process with $E Y_1<0$, $C$ an independent subordinator with finite expectation, and $X=Y+C$. A curious distributional equality proved in Huzak et al., Ann. Appl. Probab. 14 (2004) 1278--1397, states that if $E X_1<0$, then $\sup_{0\le t <\infty}Y_t$ and the supremum of $X$ just before the first time its new supremum is reached by a jump of $C$ have the same distribution. In this paper we give an alternative proof of an extension of this result and offer an explanation why it is true., Comment: 14 pp

Published
2014

28. Unavoidable collections of balls for censored stable processes

Author

Mimica, Ante and Vondraček, Zoran

Subjects
Mathematics - Probability, Primary 60J45, Secondary 31B15
Abstract

We study avoidability of collections of balls in bounded $C^{1,1}$ opens sets for censored $\alpha$-stable processes, $\alpha\in (1,2)$. The results are analog to the ones obtained for Brownian motion in S. J. Gardiner, M. Ghergu, Champagne subregions of the unit ball with unavoidable bubbles, Ann. Acad. Sci. Fenn. Math. 35 (2010) 321-329. On the way we derive a Wiener-Aikawa-type criterion for minimal thinness with respect to the censored stable processes.

Published
2013

29. Unavodiable collections of balls for isotropic L\'{e}vy processes

Author

Mimica, Ante and Vondraček, Zoran

Subjects
Mathematics - Probability, Primary 60J45, 60G51, Secondary 31B15
Abstract

A collection $\{\bar{B}(x_n,r_n)\}_{n\ge 1}$ of pairwise disjoint balls in the Euclidean space $\R^d$ is said to be avoidable with respect to a transient process $X$ if the process with positive probability escapes to infinity without hitting any ball. In this paper we study sufficient and necessary conditions for avoidability with respect to unimodal isotropic L\'evy processes satisfying a certain scaling hypothesis. These conditions are expressed in terms of the characteristic exponent of the process, or alternatively, in terms of the corresponding Green function. We also discuss the same problem for a random collection of balls. The results are generalization of several recent results for the case of Brownian motion., Comment: To appear in Stoch. Process. Appl

Published
2013

30. Boundary Harnack principle and Martin boundary at infinity for subordinate Brownian motions

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 60J45, 60J25, 60J50
Abstract

In this paper we study the Martin boundary of unbounded open sets at infinity for a large class of subordinate Brownian motions. We first prove that, for such subordinate Brownian motions, the uniform boundary Harnack principle at infinity holds for arbitrary unbounded open sets. Then we introduce the notion of $\kappa$-fatness at infinity for open sets and show that the Martin boundary at infinity of any such open set consists of exactly one point and that point is a minimal Martin boundary point.

Published
2012

31. Global uniform boundary Harnack principle with explicit decay rate and its application

Author

Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 60J45, 60J25, 60J50
Abstract

In this paper, we consider a large class of subordinate Brownian motions $X$ via subordinators with Laplace exponents which are complete Bernstein functions satisfying some mild scaling conditions at zero and at infinity. We first discuss how such conditions govern the behavior of the subordinator and the corresponding subordinate Brownian motion for both large and small time and space. Then we establish a global uniform boundary Harnack principle in (unbounded) open sets for the subordinate Brownian motion. When the open set satisfies the interior and exterior ball conditions with radius $R >0$, we get a global uniform boundary Harnack principle with explicit decay rate. Our boundary Harnack principle is global in the sense that it holds for all $R>0$ and the comparison constants do not depend on $R$, and it is uniform in the sense that it holds for all balls with radii $r \le R$ and the comparison constants depend neither on $D$ nor on $r$. As an application, we give sharp two-sided estimates for the transition density and the Green function of such subordinate Brownian motions in the half-space.

Published
2012

33. Potential theory of subordinate Brownian motions with Gaussian components

Author

Kim, Panki, Song, Renming, and Vondracek, Zoran

Subjects
Mathematics - Probability, 60J45, 31B25
Abstract

In this paper we study a subordinate Brownian motion with a Gaussian component and a rather general discontinuous part. The assumption on the subordinator is that its Laplace exponent is a complete Bernstein function with a L\'evy density satisfying a certain growth condition near zero. The main result is a boundary Harnack principle with explicit boundary decay rate for non-negative harmonic functions of the process in $C^{1,1}$ open sets. As a consequence of the boundary Harnack principle, we establish sharp two-sided estimates on the Green function of the subordinate Brownian motion in any bounded $C^{1,1}$ open set $D$ and identify the Martin boundary of $D$ with respect to the subordinate Brownian motion with the Euclidean boundary., Comment: 34 pages

Published
2011

34. Potential Theory of Subordinate Brownian Motions Revisited

Author

Kim, Panki, Song, Renming, and Vondracek, Zoran

Subjects
Mathematics - Probability, 60J45
Abstract

The paper discusses and surveys some aspects of the potential theory of subordinate Brownian motion under the assumption that the Laplace exponent of the corresponding subordinator is comparable to a regularly varying function at infinity. This extends some results previously obtained under stronger conditions., Comment: 49 pages

Published
2011

35. Minimal thinness for subordinate Brownian motion in half space

Author

Kim, Panki, Song, Renming, and Vondracek, Zoran

Subjects
Mathematics - Probability, Primary 60J50, 31C40, Secondary 31C35, 60J45, 60J75
Abstract

We study minimal thinness in the half-space $H:=\{x=(\wt{x}, x_d):\, \wt{x}\in \R^{d-1}, x_d>0\}$ for a large class of rotationally invariant L\'evy processes, including symmetric stable processes and sums of Brownian motion and independent stable processes. We show that the same test for the minimal thinness of a subset of $H$ below the graph of a nonnegative Lipschitz function is valid for all processes in the considered class. In the classical case of Brownian motion this test was proved by Burdzy., Comment: 31 pages

Published
2010

36. Two-sided Green function estimates for killed subordinate Brownian motions

Author

Kim, Panki, Song, Renming, and Vondracek, Zoran

Subjects
Mathematics - Probability, Primary 60J45, Secondary 60J75, 60G51
Abstract

A subordinate Brownian motion is a L\'evy process which can be obtained by replacing the time of the Brownian motion by an independent subordinator. The infinitesimal generator of a subordinate Brownian motion is $-\phi(-\Delta)$, where $\phi$ is the Laplace exponent of the subordinator. In this paper, we consider a large class of subordinate Brownian motions without diffusion component and with $\phi$ comparable to a regularly varying function at infinity. This class of processes includes symmetric stable processes, relativistic stable processes, sums of independent symmetric stable processes, sums of independent relativistic stable processes, and much more. We give sharp two-sided estimates on the Green functions of these subordinate Brownian motions in any bounded $\kappa$-fat open set $D$. When $D$ is a bounded $C^{1,1}$ open set, we establish an explicit form of the estimates in terms of the distance to the boundary. As a consequence of such sharp Green function estimates, we obtain a boundary Harnack principle in $C^{1,1}$ open sets with explicit rate of decay., Comment: 33 pages

Published
2010
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37. Sharp Green Function Estimates for $\Delta + \Delta^{\alpha/2}$ in $C^{1,1}$ Open Sets and Their Applications

Author

Chen, Zhen-Qing, Kim, Panki, Song, Renming, and Vondracek, Zoran

Subjects
Mathematics - Probability, Primary 31A20, 31B25, 60J45, Secondary 47G20, 60J75, 31B05
Abstract

We consider a family of pseudo differential operators $\{\Delta+ a^\alpha \Delta^{\alpha/2}; a\in [0, 1]\}$ on $\R^d$ that evolves continuously from $\Delta$ to $\Delta + \Delta^{\alpha/2}$, where $d\geq 1$ and $\alpha \in (0, 2)$. It gives rise to a family of L\'evy processes \{$X^a, a\in [0, 1]\}$, where $X^a$ is the sum of a Brownian motion and an independent symmetric $\alpha$-stable process with weight $a$. Using a recently obtained uniform boundary Harnack principle with explicit decay rate, we establish sharp bounds for the Green function of the process $X^a$ killed upon exiting a bounded $C^{1,1}$ open set $D\subset\R^d$. As a consequence, we identify the Martin boundary of $D$ with respect to $X^a$ with its Euclidean boundary. Finally, sharp Green function estimates are derived for certain L\'evy processes which can be obtained as perturbations of $X^a$.

Published
2009

38. Boundary Harnack principle for $\Delta + \Delta^{\alpha/2}$

Author

Chen, Zhen-Qing, Kim, Panki, Song, Renming, and Vondraček, Zoran

Subjects
Mathematics - Probability, 31B25, 60J45
Abstract

For $d\geq 1$ and $\alpha \in (0, 2)$, consider the family of pseudo differential operators $\{\Delta+ b \Delta^{\alpha/2}; b\in [0, 1]\}$ on $\R^d$ that evolves continuously from $\Delta$ to $\Delta + \Delta^{\alpha/2}$. In this paper, we establish a uniform boundary Harnack principle (BHP) with explicit boundary decay rate for nonnegative functions which are harmonic with respect to $\Delta +b \Delta^{\alpha/2}$ (or equivalently, the sum of a Brownian motion and an independent symmetric $\alpha$-stable process with constant multiple $b^{1/\alpha}$) in $C^{1, 1}$ open sets. Here a "uniform" BHP means that the comparing constant in the BHP is independent of $b\in [0, 1]$. Along the way, a uniform Carleson type estimate is established for nonnegative functions which are harmonic with respect to $\Delta + b \Delta^{\alpha/2}$ in Lipschitz open sets. Our method employs a combination of probabilistic and analytic techniques., Comment: 36 pages, no figure

Published
2009

39. Sharp two-sided Green function estimates for Dirichlet forms degenerate at the boundary.

Author

Kim, Panki, Renming Song, and Vondraček, Zoran

Subjects
GREEN'S functions, MARKOV processes, DIRICHLET forms, KERNEL (Mathematics), KERNEL functions
Abstract

The goal of this paper is to establish Green function estimates for a class of purely discontinuous symmetric Markov processes with jump kernels degenerate at the boundary and critical killing potentials. The jump kernel and the killing potential depend on several parameters. We establish sharp two-sided estimates on the Green functions of these processes for all admissible values of the parameters involved. Depending on the regions where the parameters belong, the estimates on the Green functions are different. In fact, the estimates have three different forms. As applications, we prove that the boundary Harnack principle holds in certain region of the parameters and fails in some other region of the parameters. Together with the main results of our previous paper [Potential Anal., online, 2021], we completely determine the region of the parameters where the boundary Harnack principle holds. [ABSTRACT FROM AUTHOR]

Published
2024
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40. Boundary Harnack Principle for Subordinate Brownian Motions

Author

Kim, Panki, Song, Renming, and Vondracek, Zoran

Subjects
Mathematics - Probability, 60J45, 60J25, 60J51
Abstract

We establish a boundary Harnack principle for a large class of subordinate Brownian motion, including mixtures of symmetric stable processes, in bounded $\kappa$-fat open set (disconnected analogue of John domains). As an application of the boundary Harnack principle, we identify the Martin boundary and the minimal Martin boundary of bounded $\kappa$-fat open sets with respect to these processes with their Euclidean boundary., Comment: 34 pages

Published
2007

42. Ruin probabilities and decompositions for general perturbed risk processes

Author

Huzak, Miljenko, Perman, Mihael, Sikic, Hrvoje, and Vondracek, Zoran

Subjects
Mathematics - Probability, 60J25 (Primary) 60G51, 60J75, 60K30, 91B30 (Secondary)
Abstract

We study a general perturbed risk process with cumulative claims modelled by a subordinator with finite expectation, with the perturbation being a spectrally negative Levy process with zero expectation. We derive a Pollaczek-Hinchin type formula for the survival probability of that risk process, and give an interpretation of the formula based on the decomposition of the dual risk process at modified ladder epochs.

Published
2004
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