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Author: Dr. Nir Regev
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1. Introduction and Motivation
Why Polynomial Phase Estimation?
In radar systems, moving targets create signals with polynomial phase characteristics due to their motion dynamics. When a target moves with:
- Constant velocity → Linear phase term
- Constant acceleration → Quadratic phase term
- Constant Jerk (changing acceleration) → Cubic phase term
The received radar signal has the general form:
$$
y(t) = b_0 \exp \{ j\sum_{m=0}^M a_m t^m\},
$$
where:
- $b_0$ = complex amplitude
- $a_m$ = polynomial coefficients related to motion parameters
- $M$ = polynomial order (degree)
The Challenge
Traditional Fourier analysis fails for polynomial phase signals because:
- Time-varying instantaneous frequency: $f_{inst}(t) = \frac{1}{2\pi}\frac{d\phi}{dt} = \frac{1}{2\pi}\sum_{m=1}^M m \cdot a_m t^{m-1}$
- Spectral spreading: Energy spreads across frequencies instead of concentrating at a single peak
- Loss of resolution: Cannot accurately estimate motion parameters