Recovery of time-dependent coefficient on Riemanian manifold for hyperbolic equations

Abstract

Given (M,g), a compact connected Riemannian manifold of dimension d ≥ 2, with boundary ∂ M, we study the inverse boundary value problem of determining a time-dependent potential q, appearing in the wave equation ∂t2u-g u+q(t,x)u=0 in M=(0,T)× M with T>0. Under suitable geometric assumptions we prove global unique determination of q∈ L∞( M) given the Cauchy data set on the whole boundary ∂ M, or on certain subsets of ∂ M. Our problem can be seen as an analogue of the Calder\'on problem on the Lorentzian manifold ( M, dt2 - g).