Compact polyhedral surfaces of an arbitrary genus and determinants of Laplacians
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🧮 math.DG
math.AP
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surfacescompactarbitrarydeterminantgenuspolyhedralbasicconformal
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Compact polyhedral surfaces (or, equivalently, compact Riemann surfaces with conformal flat conical metrics) of an arbitrary genus are considered. After giving a short self-contained survey of their basic spectral properties, we study the zeta-regularized determinant of the Laplacian as a functional on the moduli space of these surfaces. An explicit formula for this determinant is obtained.
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