Two new formulas for the numerical evaluation of the Hilbert Transform

We derive recurrence relationships for the evaluation of two integral transforms which are of interest for the numerical solution of some integral equations and for the construction of certain quadrature rules.

Recently we published two explicit formulae for finite inverse Hilbert transforms (You and Zeng, Inv Probl 22 (2006), L7-L101). This paper presents a straightforward proof of the formulae, the data requirements, and some computer simulations to verify the formulae. Examples of region-of-interest tom

A procedure for the numerical evaluation of the nth-order Hankel transform is presented. It is based on an extension of the zeroth-order algorithm proposed by S. Candel. Using an integral representation of the Bessel function, a formula is derived for the transform as a weighted integral of the Four