On the blowup of quantitative unique continuation estimates for waves and applications to stability estimates

Abstract

In this paper we are interested in the blowup of a geometric constant C(δ) appearing in the optimal quantitative unique continuation property for wave operators. In a particular geometric context we prove an upper bound for C(δ) as δ goes to 0. Here δ>0 denotes the distance to the maximal unique continuation domain. As applications we obtain stability estimates for the unique continuation property up to the maximal domain. Using our abstract framework~FO25abstract we also derive a stability estimate for a hyperbolic inverse problem. The proof is based on a global explicit Carleman estimate combined with the propagation techniques of Laurent-L\'eautaud.

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