Recovering stable kernels from exterior measurements

Abstract

We study an inverse problem for translation-invariant symmetric stable operators of the form equation* La u(x)=P.V.∫ Rn(u(x)-u(y))a((x-y)/|x-y|)|x-y|n+2s\,dy, 0<s<1, equation* where the unknown is the even angular density a on Sn. For a bounded open set Ω⊂ Rn, with Ωe= RnΩ, we consider restricted exterior Dirichlet-to-Neumann maps ΛaW1,W2, where exterior data are supported in W1Ωe and the nonlocal Neumann data are observed on W2Ωe. We prove three recovery results for the leading angular density. In the overlapping regime W1 W2, the exterior diagonal singularity determines every smooth elliptic angular density. In the separated regime W1 W2=, where this singularity is absent, we prove uniqueness in the finite harmonic angular class by an exact factorization of the stable symbol. We also prove separated-data uniqueness for real-analytic angular densities when the source and observation sets lie in the unbounded exterior component, using analytic continuation of the off-diagonal Dirichlet-to-Neumann kernel and a far-field asymptotic argument.