TY - JOUR
T1 - Analytical solutions for beams passing apertures with sharp boundaries
AU - Luz, Eitam
AU - Granot, Er'El
AU - Malomed, Boris A.
N1 - Publisher Copyright:
© 2016 IOP Publishing Ltd.
PY - 2016/7
Y1 - 2016/7
N2 - An approximation is elaborated for the paraxial propagation of diffracted beams, with both one- and two-dimensional cross sections, which are released from apertures with sharp boundaries. The approximation applies to any beam under the condition that the thickness of its edges is much smaller than any other length scale in the beam's initial profile. The approximation can be easily generalized for any beam whose initial profile has several sharp features. Therefore, this method can be used as a tool to investigate the diffraction of beams on complex obstacles. The analytical results are compared to numerical solutions and experimental findings, which demonstrates high accuracy of the approximation. For an initially uniform field confined by sharp boundaries, this solution becomes exact for any propagation distance and any sharpness of the edges. Thus, it can be used as an efficient tool to represent the beams, produced by series of slits with a complex structure, in terms of the exact analytical solution.
AB - An approximation is elaborated for the paraxial propagation of diffracted beams, with both one- and two-dimensional cross sections, which are released from apertures with sharp boundaries. The approximation applies to any beam under the condition that the thickness of its edges is much smaller than any other length scale in the beam's initial profile. The approximation can be easily generalized for any beam whose initial profile has several sharp features. Therefore, this method can be used as a tool to investigate the diffraction of beams on complex obstacles. The analytical results are compared to numerical solutions and experimental findings, which demonstrates high accuracy of the approximation. For an initially uniform field confined by sharp boundaries, this solution becomes exact for any propagation distance and any sharpness of the edges. Thus, it can be used as an efficient tool to represent the beams, produced by series of slits with a complex structure, in terms of the exact analytical solution.
KW - diffraction theory
KW - optics in computing
KW - propagation methods
UR - http://www.scopus.com/inward/record.url?scp=84979284994&partnerID=8YFLogxK
U2 - 10.1088/2040-8978/18/7/075607
DO - 10.1088/2040-8978/18/7/075607
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AN - SCOPUS:84979284994
SN - 2040-8978
VL - 18
JO - Journal of Optics (United Kingdom)
JF - Journal of Optics (United Kingdom)
IS - 7
M1 - 075607
ER -