Optimal Error Scaling of ESPRIT Algorithm Demonstrated | HackerNoon

Table of Links

Abstract and 1 Introduction

1.1 ESPRIT algorithm and central limit error scaling

1.2 Contribution

1.3 Related work

1.4 Technical overview and 1.5 Organization

2 Proof of the central limit error scaling

3 Proof of the optimal error scaling

4 Second-order eigenvector perturbation theory

5 Strong eigenvector comparison

5.1 Construction of the “good” P

5.2 Taylor expansion with respect to the error terms

5.3 Error cancellation in the Taylor expansion

5.4 Proof of Theorem 5.1

A Preliminaries

B Vandermonde matrice

C Deferred proofs for Section 2

D Deferred proofs for Section 4

E Deferred proofs for Section 5

F Lower bound for spectral estimation

References

1.2 Contribution

The main contribution of this paper is a novel analysis of the ESPRIT algorithm, which demonstrates the optimal error scaling of ESPRIT. These findings are summarized in the following theorem:

Remark 1.5 (The assumption α > 1). In the above theorem, we assume α > 1 to simplify the form of our bounds. Note that Theorem 1.4 still yields results for the ESPRIT algorithm under small noise and zero noise Ej ≡ 0 since α is only required to be an upper bound on the sub-Gaussian rate of tail decay. Our proof can be extended to provide sharper estimates for small values of α.

We present the proof of Theorem 1.6 in Appendix F. This result is similar to the Cramér–Rao bound in signal processing (cf. [SN89]). Due to the different settings, we provide a self-contained proof using the total variation distance between Gaussian distributions.