# Regularity of SLE in $(t,\kappa)$ and refined GRR estimates

**Authors:** Peter K. Friz, Huy Tran, Yizheng Yuan

arXiv: 1906.11726 · 2021-05-13

## TL;DR

This paper improves the understanding of the regularity of SLE traces by extending joint H"older continuity results to a larger range of , and introduces a new variation of the GRR inequality to support these findings.

## Contribution

It extends the joint H"older continuity of SLE traces to  < 8/3 and introduces a novel variation of the Garsia-Rodemich-Rumsey inequality.

## Key findings

- Joint H"older continuity for  < 8/3 established.
- SLE trace is stochastically continuous in  at all   8.
- New variation of the Garsia-Rodemich-Rumsey inequality developed.

## Abstract

Schramm-Loewner evolution (SLE$_\kappa$) is classically studied via Loewner evolution with half-plane capacity parametrization, driven by $\sqrt{\kappa}$ times Brownian motion. This yields a (half-plane) valued random field $\gamma = \gamma (t, \kappa; \omega)$. (H\"older) regularity of in $\gamma(\cdot,\kappa;\omega$), a.k.a. SLE trace, has been considered by many authors, starting with Rohde-Schramm (2005). Subsequently, Johansson Viklund, Rohde, and Wong (2014) showed a.s. H\"older continuity of this random field for $\kappa < 8(2-\sqrt{3})$. In this paper, we improve their result to joint H\"older continuity up to $\kappa < 8/3$. Moreover, we show that the SLE$_\kappa$ trace $\gamma(\cdot,\kappa)$ (as a continuous path) is stochastically continuous in $\kappa$ at all $\kappa \neq 8$. Our proofs rely on a novel variation of the Garsia-Rodemich-Rumsey (GRR) inequality, which is of independent interest.

## Full text

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## References

22 references — full list in the complete paper: https://tomesphere.com/paper/1906.11726/full.md

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Source: https://tomesphere.com/paper/1906.11726