A unified approach to conformal and modular invariants

TL;DR

This paper introduces a broad family of conformal invariants for bordered Riemann surfaces, linking them to modular invariants and the rigged moduli space, with applications to harmonic functions and inequalities.

Contribution

It provides a unified construction of conformal invariants using one-forms on Teichmüller space, generalizing known invariants and connecting them to modular and rigged moduli spaces.

Findings

Conformal invariants can be generated via various choices of one-forms.

The invariants include modules of doubly-connected domains and period mappings.

The approach generalizes Grunsky inequalities to Riemann surfaces.

Abstract

In this paper we give a general family of conformal invariants associated to bordered Riemann surfaces endowed with boundary parametrizations, or equivalently compact surfaces endowed with conformal maps. Each invariant is specified by a field of one-forms over a Teichm\"uller space of infinite conformal type. The invariants are positive, and under certain conditions monotonic. It is shown that these conformal invariants can be viewed as generalized modular invariants on Teichm\"uller space and as functions on the rigged moduli space of Segal and Vafa. The construction uses an identification of Teichm\"uller space and the rigged moduli space, as well as analytic work of the authors showing that the transfer or ``overfare'' of harmonic functions sharing boundary values on a quasicircle is bounded. Demanding invariance under various subgroups of the modular group -- equivalently, under the group of quasisymmetric reparametrizations of a sub-collection of borders -- generates conformal invariants. We show that a wide variety of conformal invariants can be obtained through various choices of the field of one-forms. These include modules of doubly-connected domains, period mappings obtained from harmonic measures, inequalities for higher-order conformal invariants, and the Grunsky inequalities and their recent generalizations to Riemann surfaces.