| Literature DB >> 18084527 |
L Yu, M Huang, M Chen, W Chen, W Huang, Z Zhu.
Abstract
A quasi-discrete Hankel transform (QDHT) is presented as a new and efficient framework for numerical evaluation of the zero-order Hankel transform. A discrete form of Parseval's theorem is obtained for the first time to the authors' knowledge, and the transform matrix is discussed. It is shown that the S factor, defined as the products of a truncated radius, is critical to building the QDHT.Year: 1998 PMID: 18084527 DOI: 10.1364/ol.23.000409
Source DB: PubMed Journal: Opt Lett ISSN: 0146-9592 Impact factor: 3.776