Diffraction of fractal light: New frontiers for the mathematics of edge waves

Mylova, M, McDonald, GS ORCID: https://orcid.org/0000-0002-1304-5182 and Christian, JM ORCID: https://orcid.org/0000-0003-2742-0569 2013, Diffraction of fractal light: New frontiers for the mathematics of edge waves , in: College of Science & Technology Research Showcase, 19th June 2013, University of Salford.

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The diffraction pattern produced by a plane wave (i.e., a perfectly uniform wavefront) scattering from an infinite hard edge is well-described by the Fresnel integral [1]. Such one-dimensional (1D) edge waves [see Fig. 1(a)] turn out to be truly elemental spatial structures in linear optical systems in the sense that patterns produced by other apertures [such as a slit – see Fig. 1(b)] can be decomposed into a sum of two interfering edge waves. Our group has previously established that such waves also play a fundamental role in the exact mathematical description of diffraction patterns generated from uniform illumination of polygonal apertures [2], whereby one superposes the waves from all constituent edges (each of which has, crucially, a finite length). Here, we report on the first steps taken toward considering a related but distinct physical problem, namely how a fractal light wave incident on an infinite edge is diffracted in both the near and far fields. Our method is based upon a Fresnel-type prescription, generalizing earlier analyses [1,2] to accommodate an illuminating field that comprises a spectrum with many distinct components (each spatial frequency contributes a characteristic scale length to the incident pattern). Our results can be readily applied to other classic 1D and 2D systems such as slits and polygons, respectively. References [1] M. P. Silverman and W. Strange, Am. J. Phys. 64, 773 (1996). [2] J. G. Huang, J. M. Christian, and G. S. McDonald, J. Opt. Soc. Am. A 23, 2768 (2006).

Item Type: Conference or Workshop Item (Paper)
Themes: Energy
Subjects outside of the University Themes
Schools: Schools > School of Computing, Science and Engineering
Schools > School of Computing, Science and Engineering > Salford Innovation Research Centre
Refereed: Yes
Funders: University of Salford
Depositing User: JM Christian
Date Deposited: 11 Jun 2013 14:08
Last Modified: 28 Aug 2021 19:22
URI: http://usir.salford.ac.uk/id/eprint/29306

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