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Applied Optics

Applied Optics


  • Vol. 22, Iss. 6 — Mar. 15, 1983
  • pp: 768–769

Application of VanderLugt’s operational notation to finite aperture lens systems

Marion O. Hagler  »View Author Affiliations

Applied Optics, Vol. 22, Issue 6, pp. 768-769 (1983)

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No abstract available.

Original Manuscript: October 12, 1982
Published: March 15, 1983

Marion O. Hagler, "Application of VanderLugt’s operational notation to finite aperture lens systems," Appl. Opt. 22, 768-769 (1983)

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  1. A. VanderLugt, Proc. IEEE 54, 1055 (1966). [CrossRef]
  2. R. J. Collier, C. B. Burckhardt, L. H. Lin, Optical Holography (Academic, New York, 1971), pp. 120–134.
  3. F. P. Carlson, Introduction to Applied Optics for Engineers (Academic, New York, 1977), pp. 56–76.
  4. J. D. Gaskill, Linear Systems, Fourier Transforms, and Optics (Wiley, New York, 1978), pp. 360, 391ff.
  5. M. O. Hagler, Appl. Opt. 10, 2783 (1971). [CrossRef] [PubMed]
  6. F. P. Carlson, R. E. Francois, Proc. IEEE 65, 10 (1977). [CrossRef]
  7. Equation (2) shows that the Fourier transform of ψ is essentially ψ* and generalizes to two dimensions in the obvious way: ∫∫ dxdyψ(x,y;ρ) exp[−jk(ax + by)] = j(λ/ρ)ψ*(a,b;1/ρ). See Table I of Ref. 6.
  8. J. W. Goodman, Introduction to Fourier Optics (McGraw-Hill, New York, 1968), pp. 87–88.

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