Regularized ζ(1) for Polyhedra

Abstract

Let X be a compact polyhedral surface (a compact Riemann surface with flat conformal metric T having conical singularities). The ζ-function ζ(s) of the Friedrichs Laplacian on X is meromorphic in C with a single simple pole at s=1. We define regζ(1) as s 1 ( ζ(s)- Area(X,T) 4π(s-1)). We derive an explicit expression for this spectral invariant through the holomorphic invariants of the Riemann surface X and the (generalized) divisor of the conical points of the metric T. We study the asymptotics of regζ(1) for the polyhedron obtained by sewing two other polyhedra along segments of small length. In addition, we calculate regζ(1) for a family of (non-Friedrichs) self-adjoint extensions of the Laplacian on the tetrahedron with all the conical angles equal to π.

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