Rigidity of Travelling Times for Strictly Convex Obstacles in Riemannian Manifolds
Abstract
Let K and L be two disjoint unions of strictly convex obstacles contained within a Riemannian manifold with boundary S of dimension m≥ 2. The sets of travelling times TK and TL of K and L, respectively, are composed of triples (x,y,t)∈∂ S×∂ S×R+ where t is the length of a billiard trajectory with endpoints x and y that reflects elastically on K (or L for (x,y,t)∈TL). It has been shown (arXiv:2309.11141) that (under some natural curvature bounds on S) if TK=TL and K and L were equivalent up to tangency then K = L. In this paper we remove this requirement for K and L, and show that if TK = TL then K = L whenever m≥ 3.
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