Effective potentials for de Sitter and anti de Sitter quantum fields

Abstract

We derive a systematic treatment of one-loop effective potentials for interacting scalar fields in curved spacetimes, providing a general formula valid in arbitrary geometries and explicit results for de Sitter and anti-de Sitter backgrounds. We then compute the effective potential for a scalar O(N) theory on a de Sitter space in any integer dimension. In d=3 and dimensional regularization, we extend the calculation up to two loops and compute the β-function and the anomalous mass dimension. They coincide exactly with flat-space results, despite dramatic curvature modifications to physical masses/couplings. The flat limit R∞ recovers Coleman-Weinberg, confirming consistency. Working in d=3 dimensions, we repeat the calculation for AdS3 by using point-splitting regularization, obtaining analogous results for the β-function and anomalous mass dimension.

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