Thermodynamics of Abelian Gauge Fields in Real Hyperbolic Spaces
Abstract
We work with N-dimensional compact real hyperbolic space X with universal covering M and fundamental group . Therefore, M is the symmetric space G/K, where G=SO1(N,1) and K=SO(N) is a maximal compact subgroup of G. We regard as a discrete subgroup of G acting isometrically on M, and we take X to be the quotient space by that action: X= M = G/K. The natural Riemannian structure on M (therefore on X) induced by the Killing form of G gives rise to a connection p-form Laplacian Lp on the quotient vector bundle (associated with an irreducible representation of K). We study gauge theories based on abelian p-forms on the real compact hyperbolic manifold X. The spectral zeta function related to the operator Lp, considering only the co-exact part of the p-forms and corresponding to the physical degrees of freedom, can be represented by the inverse Mellin transform of the heat kernel. The explicit thermodynamic fuctions related to skew-symmetric tensor fields are obtained by using the zeta-function regularization and the trace tensor kernel formula (which includes the identity and hyperbolic orbital integrals). Thermodynamic quantities in the high and low temperature expansions are calculated and new entropy/energy ratios established.
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