Abstract
For a reaction-diffusion equation with unknown right-hand side and non-local measurements subject to unknown constant measurement delay, we consider the nonlinear inverse problem of estimating the associated leading eigenvalues and measurement delay from a finite number of noisy measurements. We propose a reconstruction criterion and, for small enough noise intensity, prove existence and uniqueness of the desired approximation and derive closed-form expressions for the first-order condition numbers, as well as bounds for their asymptotic behavior in a regime when the number of measurements tends to infinity and the inter-sampling interval length is fixed. We perform numerical simulations indicating that the exponential fitting algorithm ESPRIT is first-order optimal, namely, its first-order condition numbers have the same asymptotic behavior as the analytic ones in this regime.
| Original language | English |
|---|---|
| Pages (from-to) | 102-107 |
| Number of pages | 6 |
| Journal | IFAC-PapersOnLine |
| Volume | 58 |
| Issue number | 27 |
| DOIs | |
| State | Published - 2024 |
| Event | 18th IFAC Workshop on Time Delay Systems, TDS 2024 - Udine, Italy Duration: 2 Oct 2023 → 5 Oct 2023 |
Funding
| Funders | Funder number |
|---|---|
| European Commission | |
| European Research Council | 101076926 |
| Israel Science Foundation | 1793/20 |
Keywords
- Data-driven control
- Estimation
- Time-delay systems