W-volume for planar domains with circular boundary

Abstract

We extend the notion of Epstein maps to conformal metrics on submanifolds of the unit sphere Sn=∂∞Hn+1. Using this construction for curves in S2, we define the W-volume for conformal metrics on domains in C=S2 with round circles as boundaries. We show that the W-volume is a realization in H3 of the determinant of the Laplacian. We use this and work of Osgood, Phillips and Sarnak to show that a classical Schottky uniformization of a genus g Riemann surface has renormalized volume bounded by (6g-8)π, and by -2π under further assumptions. This gives a partial answer to a question of Maldacena. We also then provide a H3 realization of the Loewner energy of a C2,α Jordan curve.

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