Hankel transform

Version 1.0.0.0 (136 KB) by Marcel Leutenegger
Efficient implementations of the Hankel transform and the inverse Hankel transform, respectively.
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Updated 11 Apr 2007

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The Hankel transform of order n transforms rotationally symmetric inputs in a computationally efficient manner. In particular, the Hankel transform of order 0 is equivalent to the two-dimensional Fourier transform of a rotationally symmetric input. This package contains four implementations of the Hankel transform and the inverse Hankel transform, respectively.

"hat" and "ihat" perform the Hankel transform of order n with a direct integration using a matrix product. "ht" and "iht" perform the Hankel transform of order 0 by integrating the Bessel kernel a priori. "dht" and "idht" implement the quasi-discrete Hankel transform of integer order n. And, last but not least, "fht" and "ifht" implement the quasi fast Hankel transform of order n.

For more implementation details, please refer to the online documentation at

http://ioalinux1.epfl.ch/~mleutene/MATLABToolbox/HankelTransform.html

Cite As

Marcel Leutenegger (2026). Hankel transform (https://se.mathworks.com/matlabcentral/fileexchange/13371-hankel-transform), MATLAB Central File Exchange. Retrieved .

MATLAB Release Compatibility
Created with R12
Compatible with any release
Platform Compatibility
Windows macOS Linux
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Version Published Release Notes
1.0.0.0

Fixed an error in "fht.m" reported by Mark W. Sprague - line 49 should read "if N > 1".