An inverse problem for the wave equation with one measurement and the pseudorandom noise

Abstract

We consider the wave equation (t2-g)u(t,x)=f(t,x), in n, u|_-× n=0, where the metric g=(gjk(x))j,k=1n is known outside an open and bounded set M⊂ n with smooth boundary M. We define a deterministic source f(t,x) called the pseudorandom noise as a sum of point sources, f(t,x)=Σj=1∞ ajδxj(x)δ(t), where the points xj,\ j∈+, form a dense set on M. We show that when the weights aj are chosen appropriately, u|× M determines the scattering relation on M, that is, it determines for all geodesics which pass through M the travel times together with the entering and exit points and directions. The wave u(t,x) contains the singularities produced by all point sources, but when aj=λ-λj for some λ>1, we can trace back the point source that produced a given singularity in the data. This gives us the distance in (n, g) between a source point xj and an arbitrary point y ∈ M. In particular, if ( M,g) is a simple Riemannian manifold and g is conformally Euclidian in M, these distances are known to determine the metric g in M. In the case when ( M,g) is non-simple we present a more detailed analysis of the wave fronts yielding the scattering relation on M.