Surfaces with boundary: their uniformizations, determinants of Laplacians, and isospectrality

Abstract

Let be a compact surface of type (g, n), n > 0, obtained by removing n disjoint disks from a closed surface of genus g. Assuming ()<0, we show that on , the set of flat metrics which have the same Laplacian spectrum of Dirichlet boundary condition is compact in the C∞ topology. This isospectral compactness extends the result of Osgood, Phillips, and Sarnak OPS3 for type (0,n) surfaces, whose examples include bounded plane domains. Our main ingredients are as following. We first show that the determinant of the Laplacian is a proper function on the moduli space of geodesically bordered hyperbolic metrics on . Secondly, we show that the space of such metrics is homeomorphic (in the C∞-topology) to the space of flat metrics (on ) with constantly curved boundary. Because of this, we next reduce the complicated degenerations of flat metrics to the simpler and well-known degenerations of hyperbolic metrics, and we show that determinants of Laplacians of flat metrics on , with fixed area and boundary of constant geodesic curvature, give a proper function on the corresponding moduli space. This is interesting because Khuri Kh showed that if the boundary length (instead of the area) is fixed, the determinant is not a proper function when is of type (g, n), g>0; while Osgood, Phillips, and Sarnak OPS3 showed the properness when g=0.

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