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

TL;DR

This paper derives sharp Green function estimates for a family of Lévy processes combining Brownian motion and symmetric α-stable processes in smooth domains, with applications to boundary behavior and perturbations.

Contribution

It establishes uniform boundary Harnack principles and sharp Green function bounds for these processes in $C^{1,1}$ domains, advancing understanding of their boundary behavior.

Findings

Sharp Green function bounds for $X^a$ in $C^{1,1}$ domains

Identification of Martin boundary with Euclidean boundary

Green function estimates for perturbations of $X^a$

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 $X^a$.