Volume 14, pp. 45-55, 2002.
An algorithm for nonharmonic signal analysis using Dirichlet series on convex polygons
Brigitte Forster
Abstract
This article presents a new algorithm for nonharmonic signal analysis using Dirichlet series $$ f(z) = \sum_{\lambda\in\Lambda} \kappa_{f}(\lambda)\frac{e^{\lambda z}}{L^{\prime}(\lambda)}, \quad z\in D $$ on a convex polygon $D$ as a generalization of Fourier series. Here $L$ denotes a quasipolynomial whose set of zeros $\Lambda$ generates a Riesz basis ${\cal E}(\Lambda) := \left\{\frac{e^{\lambda z}}{L^{\prime}(\lambda)}\right\}_{\lambda\in\Lambda}$ of the Smirnov space $E^{2}(D)$. The algorithm is based on a simple form of $L$ and on numerical properties of the dual basis of ${\cal E}(\Lambda)$.
Full Text (PDF) [318 KB], BibTeX
Key words
nonharmonic Fourier series, Dirichlet series, signal analysis, time series analysis.
AMS subject classifications
(2000) 42C15, 30B50, 37M10.
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