On the Loewner energy of a welding homeomorphism

Abstract

To any Jordan curve one may associate a circle homeomorphism : S1 S1 via conformal welding. Through this correspondence, the Loewner energy IL, also known as the universal Liouville action, is a K\"ahler potential for the unique homogeneous K\"ahler metric on the universal Teichm\"uller space. Despite this, explicit expressions for IL in terms of alone do not seem to be available in the literature. In this paper, we obtain such formulas. For this, we introduce an operator defined using the Fourier coefficients of the function \[ (z,w) |(z)-(w)z-w|, (z,w) ∈ S1 × S1. \] We relate to the single-layer potential and composition operator, and prove an analog of the classical Grunsky inequalities for quasisymmetric . We show moreover that is Weil--Petersson if and only if is Hilbert--Schmidt, and we express IL as several related Fredholm determinants as well as a regularized Fredholm determinant. We also treat Schatten classes, and we obtain formulas in terms of Dirichlet integrals involving ' and in terms of the composition operator induced by .