Discrete Bessel functions and transform
Abstract
We present a straightforward discretization of the Bessel functions to discrete counterparts , of integer orders on integer points , that we call discrete Bessel functions. These are built from a Bessel integral generating function, restricting the Fourier transform over the circle to points. We show that the discrete Bessel functions satisfy several linear and quadratic relations, particularly Graf's product-displacement formulas, that are exact analogues of well-known relations between the continuous functions. It is noteworthy that these discrete Bessel functions approximate very closely the values of the continuous functions in ranges . For fixed , this provides an -point transform between functions of order and of position, and , which is efficient for the Fourier analysis of finite decaying signals.
Keywords
Cite
@article{arxiv.2005.06076,
title = {Discrete Bessel functions and transform},
author = {Kenan Uriostegui and Kurt Bernardo Wolf},
journal= {arXiv preprint arXiv:2005.06076},
year = {2026}
}
Comments
11 pages, 3 figures