# Schauder estimates for Poisson equations associated with non-local   Feller generators

**Authors:** Franziska K\"uhn

arXiv: 1902.01760 · 2021-10-06

## TL;DR

This paper develops Schauder estimates for solutions to Poisson equations linked with Feller generators, broadening regularity results for a wide class of stochastic processes including Lévy processes and their variants.

## Contribution

It introduces a novel approach using Hölder estimates for Feller semigroups to derive regularity and Schauder estimates for Poisson equations with non-local operators.

## Key findings

- Schauder estimates established for fractional Laplacians of variable order.
- Regularity results extended to stable-like processes.
- Applicable to a broad class of Feller processes including Lévy-driven SDEs.

## Abstract

We show how H\"older estimates for Feller semigroups can be used to obtain regularity results for solutions to the Poisson equation $Af=g$ associated with the (extended) infinitesimal generator $A$ of a Feller process. The regularity of $f$ is described in terms of H\"older-Zygmund spaces of variable order and, moreover, we establish Schauder estimates. Since H\"{o}lder estimates for Feller semigroups have been intensively studied in the last years, our results apply to a wide class of Feller processes, e.g. random time changes of L\'evy processes and solutions to L\'evy-driven stochastic differential equations. Most prominently, we establish Schauder estimates for the Poisson equation associated with the fractional Laplacian of variable order. As a by-product, we obtain new regularity estimates for semigroups associated with stable-like processes.

## Full text

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## References

46 references — full list in the complete paper: https://tomesphere.com/paper/1902.01760/full.md

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Source: https://tomesphere.com/paper/1902.01760