High-frequency solutions to the constraint equations

Abstract

We construct high-frequency initial data for the Einstein vacuum equations in dimension 3+1 by solving the constraint equations on R3. Our family of solutions (gλ,Kλ)λ∈(0,1] is defined through a high-frequency expansion similar to the geometric optics approach and is close in a particular sense to the data of a null dust. In order to solve the constraint equations, we use their conformal formulation and the main challenge of our proof is to adapt this method in the high-frequency context. The main application of this article is our companion article Touati2022a where we construct high-frequency gravitational waves in generalised wave gauge.