# Schauder estimates for drifted fractional operators in the supercritical   case

**Authors:** Paul-\'Eric Chaudru de Raynal, St\'ephane Menozzi, Enrico Priola

arXiv: 1902.02616 · 2019-02-08

## TL;DR

This paper establishes global Schauder estimates for a class of non-local operators combining fractional Laplacians and first order terms in the supercritical case, with results applicable to various stable-type operators.

## Contribution

It proves Schauder estimates for supercritical fractional operators without relying on the extension property, extending applicability to relativistic and cylindrical stable operators.

## Key findings

- Schauder estimates hold under the condition α + β > 1.
- Constants in estimates are independent of the first order term's L-infinity norm.
- Results apply to a broad class of stable-type operators, including relativistic and cylindrical variants.

## Abstract

We consider a non-local operator $L_{{ \alpha}}$ which is the sum of a fractional Laplacian $\triangle^{\alpha/2} $, $\alpha \in (0,1)$, plus a first order term which is measurable in the time variable and locally $\beta$-H\"older continuous in the space variables. Importantly, the fractional Laplacian $\Delta^{ \alpha/2} $ does not dominate the first order term. We show that global parabolic Schauder estimates hold even in this case under the natural condition $\alpha + \beta >1$. Thus, the constant appearing in the Schauder estimates is in fact independent of the $L^{\infty}$-norm of the first order term. In our approach we do not use the so-called extension property and we can replace $\triangle^{\alpha/2} $ with other operators of $\alpha$-stable type which are somehow close, including the relativistic $\alpha$-stable operator. Moreover, when $\alpha \in (1/2,1)$, we can prove Schauder estimates for more general $\alpha$-stable type operators like the singular cylindrical one, i.e., when $\triangle^{\alpha/2} $ is replaced by a sum of one dimensional fractional Laplacians $\sum_{k=1}^d (\partial_{x_k x_k}^2 )^{\alpha/2}$.

## Full text

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## References

35 references — full list in the complete paper: https://tomesphere.com/paper/1902.02616/full.md

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Source: https://tomesphere.com/paper/1902.02616