A bstract We consider properties of the gravitational path integral, Z₆ₑ₀ₕ, of a four-dimensional gravitational effective field theory with Λ > 0 at the quantum level. To leading order, Z₆ₑ₀ₕ is dominated by a four-sphere saddle subject to small fluctuations. Beyond this, Z₆ₑ₀ₕ receives contributions from additional geometries that may include Einstein metrics of positive curvature. We discuss how a general positive curvature Einstein metric contributes to Z₆ₑ₀ₕ at one-loop level. Along the way, we discuss Einstein-Maxwell theory with Λ > 0, and identify an interesting class of closed non-Einstein gravitational instantons. We provide a detailed study for the specific case of CP^2 which is distinguished as the saddle with second largest volume and positive definite tensor eigenspectrum. We present exact one-loop results for scalar particles, Maxwell theory, and Einstein gravity about the Fubini-Study metric on CP^2.
Anninos et al. (Wed,) studied this question.