Strong Existence and Uniqueness for Singular SDEs Driven by Stable Processes
Probability
2024-04-23 v1
Abstract
We consider the one-dimensional stochastic differential equation \begin{equation*} X_t = x_0 + L_t + \int_0^t \mu(X_s)ds, \quad t \geq 0, \end{equation*} where is a finite measure of Kato class with and is a symmetric -stable process with . We derive weak and strong well posedness for this equation when and , respectively, and show that the condition is sharp for weak existence. We furthermore reformulate the equation in terms of the local time of the solution and prove its well posedness. To this end, we also derive a Tanaka-type formula for a symmetric, -stable processes with that is perturbed by an adapted, right-continuous process of finite variation.
Cite
@article{arxiv.2404.13729,
title = {Strong Existence and Uniqueness for Singular SDEs Driven by Stable Processes},
author = {Leonid Mytnik and Johanna Weinberger},
journal= {arXiv preprint arXiv:2404.13729},
year = {2024}
}