Parthasarathy Srinivasan, Oracle Corporation, USA
The Prony method for approximating signals comprising sinusoidal/exponential components is known through the pioneering work of Prony in his seminal dissertation in the year 1795. However, the Prony method saw the light of real world application only upon the advent of the computational era, which made feasible the extensive numerical intricacies and labor which the method demands inherently. While scientific works (such as Total Least Squares method) exist , which focus on alleviating some of the problems arising due to computational imprecision, they do not provide a consistently assured level of highly precise results. This study improvises upon the Prony method by observing that a better (more precise) computational approximation can be obtained under the premise that adjustment can be made for computational error , in the autoregressive model setup in the initial step of the Prony computation itself. This adjustment is in proportion to the deviation of the coefficients in the same autoregressive model. The results obtained by this improvisation live up to the expectations of obtaining consistency and higher value in the precision of the output (recovered signal) approximations as shown in this current work.
Prony Method, Fourier Series, Auto Regression, Imprecision