Effective constrained scalar-Gauss-Bonnet inflation yields ns ≃ 0.958 and r ≃ 2.7×10^{-4} with the exact theory eliminating propagating scalar degrees of freedom via vanishing lapse perturbation and ḋR=0.
Solar system constraints on f(G) gravity models
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abstract
We discuss solar system constraints on f(G) gravity models, where f is a function of the Gauss-Bonnet term G. We focus on cosmologically viable f(G) models that can be responsible for late-time cosmic acceleration. These models generally give rise to corrections of the form epsilon*(r/rs)^p to the vacuum Schwarzschild solution, where epsilon = H^2 rs^2 << 1, rs is the Schwarzschild radius of Sun, and H is the Hubble parameter today. We generally estimate the strength of modifications to General Relativity in order to confront models with a number of experiments such as the deflection of light and the perihelion shift. We show that cosmologically viable f(G) models can be consistent with solar system constraints for a wide range of model parameters.
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2026 1verdicts
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Effective Constrained Scalar--Gauss--Bonnet Inflation Motivated by $f(R,\mathcal{G})$ Gravity
Effective constrained scalar-Gauss-Bonnet inflation yields ns ≃ 0.958 and r ≃ 2.7×10^{-4} with the exact theory eliminating propagating scalar degrees of freedom via vanishing lapse perturbation and ḋR=0.