Fast Computation of Contour Integrals of Rational Functions

Analytical expressions through the binomial coefficients and recursive relations are derived for the expansion coefficients of overlap integrals in terms of a product of well-known auxiliary functions A and B . These formulas are especially k k useful for the calculation of overlap integrals for lar

This paper is concerned with two aspects of the numerical calculation of integral transforms. The first is finding a necessary and sufficient condition that enables converting an integral transform into a correlation (convolution) form. The condition and the transformation that implements it are gen

The spatial Green's functions of multilayered microstrip antennas are calculated using the two-level discrete complex image method (DCIM). The selection of the integration path and the expansion function in two-level DCIM is analyzed, and a novel integration path is presented, which can be used to c

## Abstract The use of atmospheric transfer functions is common in image reconstruction techniques such as speckle interferometry to calibrate the Fourier amplitudes of the reconstructed images. Thus, an accurate model is needed to ensure proper photometry in the reconstruction. The situation compl

## Abstract Let __F__ be a continuous real‐valued function defined on [−1, 1] × [−1,1]. For purposes of simplifaction in some numerical processes, one may desire to have an approximation of the function __F__. We present a known method of approximation called the best rational product approximation