Spectral Functions for Gauge Fields in Rindler-Like Spaces
Abstract
A class of conformal deformations of Rindler-like spaces is analyzed. We study the spectral properties of the Laplace operators associated with p-forms and acting in these spaces and in their spatial sections. The spectral density of continuum spectrum and the spectral zeta functions related to the abelian p-forms in real compact hyperbolic manifolds are obtained.
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