Deriving the integral representation of a fractional Hankel transform from a fractional Fourier transform

L Yu; Y Lu; X Zeng; M Huang; M Chen; W Huang; Z Zhu

doi:10.1364/ol.23.001158

Deriving the integral representation of a fractional Hankel transform from a fractional Fourier transform

Opt Lett. 1998 Aug 1;23(15):1158-60. doi: 10.1364/ol.23.001158.

Authors

L Yu¹, Y Lu, X Zeng, M Huang, M Chen, W Huang, Z Zhu

Affiliation

¹ Department of Physics, Xiamen University, Xiamen, Fujian 361005, China.

PMID: 18087459
DOI: 10.1364/ol.23.001158

Abstract

We derive the integral representation of a fractional Hankel transform (FRHT) from a fractional Fourier transform. Some basic properties of the FRHT such as Parseval's theorem and its optical implementation are discussed qualitatively.