Toggle Main Menu Toggle Search

ePrints

Application of Riesz transforms to the isotropic AM-PM decomposition of geometrical-optical illusion images

Lookup NU author(s): Dr Ignacio Serrano-Pedraza

Downloads

Full text for this publication is not currently held within this repository. Alternative links are provided below where available.


Abstract

The existence of a special second-order mechanism in the human visual system, able to demodulate the envelope of visual stimuli, suggests that spatial information contained in the image envelope may be perceptually relevant. The Riesz transform, a natural isotropic extension of the Hilbert transform to multidimensional signals, was used here to demodulate band-pass filtered images of well-known visual illusions of length, size, direction, and shape. We show that the local amplitude of the monogenic signal or envelope of each illusion image conveys second-order information related to image holistic spatial structure, whereas the local phase component conveys information about the spatial features. Further low-pass filtering of the illusion image envelopes creates physical distortions that correspond to the subjective distortions perceived in the illusory images. Therefore the envelope seems to be the image component that physically carries the spatial information about these illusions. This result contradicts the popular belief that the relevant spatial information to perceive geometrical-optical illusions is conveyed only by the lower spatial frequencies present in their Fourier spectrum. (c) 2010 Optical Society of America


Publication metadata

Author(s): Sierra-Vazquez V, Serrano-Pedraza I

Publication type: Article

Publication status: Published

Journal: Journal of the Optical Society of America A: Optics, Image Science, and Vision

Year: 2010

Volume: 27

Issue: 4

Pages: 781-796

Print publication date: 01/04/2010

ISSN (print): 1084-7529

ISSN (electronic): 1520-8532

Publisher: Optical Society of America

URL: http://dx.doi.org/10.1364/JOSAA.27.000781

DOI: 10.1364/JOSAA.27.000781


Altmetrics

Altmetrics provided by Altmetric


Actions

    Link to this publication


Share