Heat-kernel Coefficients and Spectra of the Vector Laplacians on Spherical Domains with Conical Singularities
Abstract
The spherical domains Sdβ with conical singularities are a convenient arena for studying the properties of tensor Laplacians on arbitrary manifolds with such a kind of singular points. In this paper the vector Laplacian on Sdβ is considered and its spectrum is calculated exactly for any dimension d. This enables one to find the Schwinger-DeWitt coefficients of this operator by using the residues of the ζ-function. In particular, the second coefficient, defining the conformal anomaly, is explicitly calculated on Sdβ and its generalization to arbitrary manifolds is found. As an application of this result, the standard renormalization of the one-loop effective action of gauge fields is demonstrated to be sufficient to remove the ultraviolet divergences up to the first order in the conical deficit angle.
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