English

A Fermionic Grunsky operator

Complex Variables 2023-11-23 v1 Mathematical Physics Differential Geometry Functional Analysis math.MP Representation Theory

Abstract

To a conformal map ff from the disk D\mathbb{D} into the complex plane onto a domain with rectifiable Ahlfors-regular boundary, we associate a new kind of Grunsky operator on the Hardy space of the unit disk. This is analogous to the classical Grunsky operator, which itself can be viewed as an operator on Bergman or Dirichlet space. We show that the pull-back of the Smirnov space of the complement of f(D)f(\mathbb{D}) by ff is the graph of the Grunsky operator. We also characterize those domains with rectifiable Ahlfors-regular boundaries such that the Grunsky operator is Hilbert-Schmidt. In particular, we show that if the Grunsky operator is Hilbert-Schmidt, then f(D)f(\mathbb{D}) is a Weil-Petersson quasidisk. The formulations of the results and proofs make essential use of a geometric treatment of Smirnov space as a space of half-order differentials.

Keywords

Cite

@article{arxiv.2311.12972,
  title  = {A Fermionic Grunsky operator},
  author = {Peter Kristel and Eric Schippers and Wolfgang Staubach},
  journal= {arXiv preprint arXiv:2311.12972},
  year   = {2023}
}
R2 v1 2026-06-28T13:27:56.072Z