English

Loewner chains and H\"older geometry

Complex Variables 2016-02-24 v2 Probability

Abstract

The Loewner equation provides a correspondence between continuous real-valued functions λt\lambda_t and certain increasing families of half-plane hulls KtK_t. In this paper we study the deterministic relationship between specific analytic properties of λt\lambda_t and geometric properties of KtK_t. Our motivation comes, however, from the stochastic Loewner equation (SLEκ_{\kappa}), where the associated function λt\lambda_t is a scaled Brownian motion and the corresponding domains H\Kt\mathbb{H} \backslash K_t are H\"older domains. We prove that if the increasing family KtK_t is generated by a simple curve and the final domain H\KT\mathbb{H} \backslash K_T is a H\"older domain, then the corresponding driving function has a modulus of continuity similar to that of Brownian motion. Informally, this is a converse to the fact that SLEκ_{\kappa} curves are simple and their complementary domains are H\"older, when κ<4\kappa < 4. We also study a similar question outside of the simple curve setting, which informally corresponds to the SLE regime κ>4\kappa > 4. In the process, we establish general geometric criteria that guarantee that KtK_t has a Lip(1/2)(1/2) driving function.

Cite

@article{arxiv.1410.5701,
  title  = {Loewner chains and H\"older geometry},
  author = {Kyle Kinneberg},
  journal= {arXiv preprint arXiv:1410.5701},
  year   = {2016}
}

Comments

32 pages; v2: published version

R2 v1 2026-06-22T06:31:18.670Z