On a stability of time-optimal version of the Boundary Control method

Abstract

Let Ω be a Riemannian manifold with boundary. The time-optimal version of the BC-method determines the parameters in the T-neigh\-bor\-hood ΩT of ∂Ω from the boundary observations (response operator) R2T on the time segment [0,2T]. It visualizes the invisible waves supported in ΩT, by reconstructing the operator WT that creates these waves. The visualization is based on the triangular factorization of the operator CT:=WT\,*WT in the form CT:=FT\,*FT with a factor FT=UTWT, where UT is a unitary operator. The factorization CT FT has certain continuity properties, due to which the time-optimal reconstruction R2T CT FT WT turns out to be continuous (stable) in the sense of relevant operator topologies (convergences). As an example, determination of the potential q in the wave equation utt-Δu+qu=0 from R2T is considered. We show that R2Tj R2T implies qj q in H-2(ΩT). However, the question of quantitative estimates of stability (the rate of convergence) remains open.