A rational-expansion-based method to compute Gabor coefficients of 2D indicator functions supported on polygonal domain

Ligang Sun (Corresponding author), Roeland Dilz, Martijn C. van Beurden

Onderzoeksoutput: Bijdrage aan tijdschriftTijdschriftartikelAcademicpeer review

2 Citaten (Scopus)
95 Downloads (Pure)

Samenvatting

We propose a method to compute Gabor coefficients of a two-dimensional (2D) indicator function supported on a polygonal domain by means of rational expansion of the Faddeeva function and by solving second-order linear difference equations. This method has the following three attractive features: (1) the problem of computing Gabor coefficients is formulated as the calculation of a sequence of integrals with a uniform structure, (2) a rational expansion based on fast Fourier transform (FFT) is used to approximate the Faddeeva function on the entire complex plane, (3) second-order inhomogeneous linear difference equations are derived for previous integrals and they are solved stably with Olver’s algorithm. Numerical quadrature to compute Gabor coefficients is avoided. Numerical examples show this rational-expansion-based method significantly outperforms numerical quadrature in terms of computation time while maintaining accuracy.
Originele taal-2Engels
Pagina's (van-tot)487-502
Aantal pagina's16
TijdschriftMathematics and Computers in Simulation
Volume206
DOI's
StatusGepubliceerd - 1 apr. 2023

Financiering

This work was funded by NWO-TTW, The Netherlands as part of the HTSM program under project number 16184. L. Sun is grateful to J. A. C. Weideman from Stellenbosch University for his support. The authors also thank H. G. Feichtinger for his contributions to the contents of this paper.

FinanciersFinanciernummer
NWO-TTW16184
University of Stellenbosch

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