Unique continuation and extensions of Killing vectors at boundaries for stationary vacuum space-times

Abstract

Generalizing Riemannian theorems of Anderson-Herzlich and Biquard, we show that two (n+1)-dimensional stationary vacuum space-times (possibly with cosmological constant ∈ ) that coincide up to order one along a timelike hypersurface T are isometric in a neighbourhood of T. We further prove that KIDS of ∂ M extend to Killing vectors near ∂ M. In the AdS type setting, we show unique continuation near conformal infinity if the metrics have the same conformal infinity and the same undetermined term. Extension near ∂ M of conformal Killing vectors of conformal infinity which leave the undetermined Fefferman-Graham term invariant is also established.