Cosmological Newtonian limits on large spacetime scales

Abstract

We establish the existence of 1-parameter families of ε-dependent solutions to the Einstein-Euler equations with a positive cosmological constant >0 and a linear equation of state p=ε2 K , 0<K≤ 1/3, for the parameter values 0<ε < ε0. These solutions exist globally on the manifold M=(0,1]× R3, are future complete, and converge as ε 0 to solutions of the cosmological Poisson-Euler equations. They represent inhomogeneous, nonlinear perturbations of a FLRW fluid solution where the inhomogeneities are driven by localized matter fluctuations that evolve to good approximation according to Newtonian gravity.