On the Bartnik conjecture for the static vacuum Einstein equations
Abstract
We prove that given any smooth metric γ and smooth positive function H on S2, there is a constant λ > 0, depending on (γ, H), and an asymptotically flat solution (M, g, u) of the static vacuum Einstein equations on M = R3 B3, such that the induced metric and mean curvature of (M, g, u) at ∂ M are given by (γ, λ H). This gives a partial resolution of a conjecture of Bartnik.
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