Determining both leading coefficient and source in a nonlocal elliptic equation

Abstract

In this short note, we investigate an inverse source problem associated with a nonlocal elliptic equation ( -∇ · σ ∇ )s u =F that is given in a bounded open set ⊂ Rn, for n≥ 3 and 0<s<1. We demonstrate both σ and F can be determined uniquely by using the exterior Dirichlet-to-Neumann (DN) map in e:=Rn . The result is intriguing in that analogous theory cannot be true for the local case generally, that is, s=1. The key ingredients to prove the uniqueness is based on the unique continuation principle for nonlocal elliptic operators and the reduction from the nonlocal to the local via the Stinga-Torrea extension problem.

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