TY - JOUR
T1 - Frequency-domain scattering by nonuniform truncated arrays: Wave-oriented data processing for inversion and imaging
AU - McClure, Mark
AU - Kralj, David
AU - Hsu, Teng Tai
AU - Carin, Lawrence
AU - Felsen, Leopold B.
N1 - Generated from Scopus record by KAUST IRTS on 2021-02-09
PY - 1994/1/1
Y1 - 1994/1/1
N2 - We previously presented an asymptotic diffraction theory for time-harmonic and transient scattering by arbitrarily illuminated truncated nonuniform thin-wire gratings [J. Opt. Soc. Am. A 11, 1291 (1994)]. We parameterized and interpreted the results in terms of scattered truncated Floquet modes (FM’s) and Floquet- modulated edge diffraction, which generalize the constructs of the conventional geometric theory of diffraction (GTD). We also demonstrated that numerical implementation of the FM-GTD algorithm yields results that compare very well with data computed from rigorously based numerical reference solutions. We enlarge the previous frequency-domain numerical data base for gratings to scattering by truncated arrays whose elements are arbitrarily oriented strips rather than thin-wire filaments and also to arrays whose element locations depart from truncated periodicity in a random rather than an orderly maimer. We show that the FM-GTD parameterization of the scattered field remains applicable under these generalized conditions. With a view toward inversion and imaging, our principal purpose is the application of space-wave-number phase-space processing techniques to extract the footprints of truncated nonuniform periodicity from the scattered-field data. Because the processing is tied to the wave physics, we refer to this procedure as wave-oriented data processing. Implementation involves projection onto appropriate phase-space subdomains and the generation of space-wave-number phase-space distributions by windowed Fourier transforms. It is found that this form of processing in the frequency domain highlights effects of truncation and perturbed periodicity but is not very sensitive to the structure of the array elements (i.e., wires versus strips). In a companion paper [J. Opt. Soc. Am. A 11, 2685 (1994)] we perform phase-space processing in the time domain, show how the time-domain FM-GTD phenomenology is revealed through time-frequency distributions, and show also how short-pulse excitation enhances the sensitivity with respect to element structure by means of spatial-temporal resolution. © 1994 Optical Society of America.
AB - We previously presented an asymptotic diffraction theory for time-harmonic and transient scattering by arbitrarily illuminated truncated nonuniform thin-wire gratings [J. Opt. Soc. Am. A 11, 1291 (1994)]. We parameterized and interpreted the results in terms of scattered truncated Floquet modes (FM’s) and Floquet- modulated edge diffraction, which generalize the constructs of the conventional geometric theory of diffraction (GTD). We also demonstrated that numerical implementation of the FM-GTD algorithm yields results that compare very well with data computed from rigorously based numerical reference solutions. We enlarge the previous frequency-domain numerical data base for gratings to scattering by truncated arrays whose elements are arbitrarily oriented strips rather than thin-wire filaments and also to arrays whose element locations depart from truncated periodicity in a random rather than an orderly maimer. We show that the FM-GTD parameterization of the scattered field remains applicable under these generalized conditions. With a view toward inversion and imaging, our principal purpose is the application of space-wave-number phase-space processing techniques to extract the footprints of truncated nonuniform periodicity from the scattered-field data. Because the processing is tied to the wave physics, we refer to this procedure as wave-oriented data processing. Implementation involves projection onto appropriate phase-space subdomains and the generation of space-wave-number phase-space distributions by windowed Fourier transforms. It is found that this form of processing in the frequency domain highlights effects of truncation and perturbed periodicity but is not very sensitive to the structure of the array elements (i.e., wires versus strips). In a companion paper [J. Opt. Soc. Am. A 11, 2685 (1994)] we perform phase-space processing in the time domain, show how the time-domain FM-GTD phenomenology is revealed through time-frequency distributions, and show also how short-pulse excitation enhances the sensitivity with respect to element structure by means of spatial-temporal resolution. © 1994 Optical Society of America.
UR - https://www.osapublishing.org/abstract.cfm?URI=josaa-11-10-2675
UR - http://www.scopus.com/inward/record.url?scp=0028530753&partnerID=8YFLogxK
U2 - 10.1364/JOSAA.11.002675
DO - 10.1364/JOSAA.11.002675
M3 - Article
SN - 1520-8532
VL - 11
SP - 2675
EP - 2684
JO - Journal of the Optical Society of America A: Optics and Image Science, and Vision
JF - Journal of the Optical Society of America A: Optics and Image Science, and Vision
IS - 10
ER -