A limit equation associated to the solvability of the vacuum Einstein constraint equations using the conformal method

Abstract

Let (M,g) be a compact Riemannian manifold on which a trace-free and divergence-free σ ∈ W1,p and a positive function τ ∈ W1,p, p > n, are fixed. In this paper, we study the vacuum Einstein constraint equations using the well known conformal method with data σ and τ. We show that if no solution exists then there is a non-trivial solution of another non-linear limit equation on 1-forms. This last equation can be shown to be without solutions no solution in many situations. As a corollary, we get existence of solutions of the vacuum Einstein constraint equation under explicit assumptions which in particular hold on a dense set of metrics g for the C0-topology.