论文信息 - Quasi-discrete Hankel transform.

Quasi-discrete Hankel transform.

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.

[1] A. Siegman. Quasi fast Hankel transform. , 1977, Optics letters.

[2] Neal C. Gallagher,et al. Fast algorithm for the computation of zero-order Hankel transform (A) , 1981 .

[3] Sandro De Silvestri,et al. High-accuracy fast Hankel transform for optical beam propagation , 1992 .

[4] Antoniangelo Agnesi,et al. Numerical evaluation of the Hankel transform: remarks , 1993 .