Characterization of frames for source recovery from dynamical samples

Abstract

In this paper, we address the problem of recovering constant source terms in a discrete dynamical system represented by xn+1 = Axn + w, where xn is the n-th state in a Hilbert space H, A is a bounded linear operator in B(H), and w is a source term within a closed subspace W of . Our focus is on the stable recovery of w using time-space sample measurements formed by inner products with vectors from a Bessel system G ⊂ H. We establish the necessary and sufficient conditions for the recovery of w from these measurements, independent of the unknown initial state x0 and for any w ∈ W. This research is particularly relevant to applications such as environmental monitoring, where precise source identification is critical.