Krylov Subspace Methods in Dynamical Sampling

Abstract

Let B be an unknown linear evolution process on Cd l2( Zd) driving an unknown initial state x and producing the states \B x, = 0,1,…\ at different time levels. The problem under consideration in this paper is to find as much information as possible about B and x from the measurements Y=\x(i), Bx(i), …, Bix(i): i ∈ ⊂ Zd\. If B is a "low-pass" convolution operator, we show that we can recover both B and x, almost surely, as long as we double the amount of temporal samples needed in ADK13 to recover the signal propagated by a known operator B. For a general operator B, we can recover parts or even all of its spectrum from Y. As a special case of our method, we derive the centuries old Prony's method BDVMC08, P795, PP13 which recovers a vector with an s-sparse Fourier transform from 2s of its consecutive components.