Non-Perturbative Bounds on Cosmological Backreaction, the Non-Linear Scale, and Gauge-Invariant Mutual Information from the Matter Power Spectrum

Abstract

We apply the mesoscopic coarse-graining framework of~OsanoMeso,OsanoExtensivity,OsanoPerturbation to three problems in Cosmological Perturbation Theory and the backreaction debate. (i)~A non-perturbative lower bound on the kinematic backreaction in the Buchert equations, derived from the Gibbs--Bogoliubov inequality: cannot be suppressed below its linear-perturbation-theoryvalue, regardless of the degree of non-linearity, provided the system satisfies stability and temperedness. (ii)~The radius of convergence of the mesoscopic cumulant expansion equals O(-1), the non-linear scale of the matter power spectrum, providing a KAM-theorem explanation for why standard perturbation theory fails at k>. (iii)~For a Gaussian matter field, the inter-cell mutual information is exactly I(i,j)=-12(1-rij2), gauge-invariant at linear order and computable directly from the observed P(k); for ΛCDM at =50\,Mpc\,h-1, I NN≈ 0.10.The total mutual information gives a data-computable measure of the backreaction correction to the FRW free energy. The gauge proof holds at linear order; the KAM identification is exact; the backreaction bound rests on a stated conjecture.