Remarks on the determination of the Lorentzian metric by the lengths of geodesics or null-geodesics

Abstract

We consider a Lorentzian metric in R×Rn. We show that if we know the lengths of the space-time geodesics starting at (0,y,η) when t=0, then we can recover the metric at y. We prove the rigidity of Lorentzian metrics. We also prove a variant of the rigidity property for the case of null-geodesics: if two metrics are close and if corresponding null-geodesics have equal Euclidian lengths then the metrics are equal.