Journal ArticleDOI
Beyond the Fresnel approximation for focused waves
TLDR
In this paper, the Rayleigh-Sommerfeld and Kirchhoff solutions to the diffraction of a converging spherical (or cylindrical) wave are expressed in terms of a series of derivatives of the field estimate that follows from the Fresnel approximation.Abstract:
By extension of the transitional operator method developed by Wunsche, the Rayleigh–Sommerfeld and Kirchhoff solutions to the diffraction of a converging spherical (or cylindrical) wave are expressed in terms of a series of derivatives of the field estimate that follows from the Fresnel approximation. This result allows a systematic assessment of the error associated with the paraxial wave model for focused fields and offers simple corrections to this model. In particular, for simple diffracting masks, the Fresnel approximation leads to estimates of the field that have a relative error near focus that is of the order of one on the square of the f-number. The number of significant digits in the field estimate is shown to be doubled by retaining just the first of the series of corrections derived here.read more
Citations
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Journal ArticleDOI
Nonparaxial Bessel-Gauss beams.
TL;DR: Close-form expressions of all corrections to be added to the solution that is pertinent to the corresponding paraxial problem are found, expressed in terms of two families of polynomials that encompass the Laguerre-Gauss polynoms for the particular case of a fundamental Gaussian beam.
Journal ArticleDOI
Fast method for physical optics propagation of high-numerical-aperture beams.
TL;DR: A method is presented that expands the scheme of physical optics propagation beyond the Fresnel approximation to include beams that are nonparaxial, and can account for astigmatic coupling effects originating purely from diffraction.
Journal ArticleDOI
Growth and spectroscopic characterizations of Nd3+-doped BaGd2(MoO4)4 crystal
TL;DR: In this article, the absorption and fluorescence spectra of Nd3+ : BaGd2(MoO4)(4) 4 crystal with dimensions of 20mm x 28mm were investigated.
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Finite-aperture effects for Fourier transform systems with convergent illumination. Part I: 2-D system analysis
TL;DR: This paper studies some of the practical limits introduced by using a converging spherical lens of finite aperture to produce the illuminating field in the implementation of the SOFT and shows that the worst-case errors in the resulting SOFT can be quantified and avoided.
Journal ArticleDOI
Aberrations in Helmholtz optics
TL;DR: The non-traditional formalism of Helmholtz optics reproduces the traditional results as expected as discussed by the authors, but it leads to wavelength-dependent modifications of the paraxial as well as the aberrating behavior.
References
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Journal ArticleDOI
From Maxwell to paraxial wave optics
TL;DR: In this paper, the paraxial approximation to the exact Maxwell equations is shown to be incompatible with the exact equations of light beam propagation through an inhomogeneous, isotropic medium with a possibly nonlinear index of refraction.
Journal ArticleDOI
Validity of the Fresnel approximation in the near field
TL;DR: In this article, it was shown that the Fresnel approximation for collimated propagation is quite good (within about 2% in amplitude and 0.02 rad in phase) in every case, including that with the limit of a high Fresnel number.
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Transition from the paraxial approximation to exact solutions of the wave equation and application to Gaussian beams
TL;DR: In this paper, two transition operators, T1 and T2, are proposed to transform the parabolic equation of the paraxial approximation into exact monochromatic solutions of the scalar wave equation or of the corresponding Helmholtz equation.
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Free-space wave propagation beyond the paraxial approximation
TL;DR: In this article, the authors considered wave propagation in free space without invoking the paraxial approximation and provided an explanation for the discrepancy which arises when the general formalism is applied to the case of a Gaussian beam.
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Closed Solutions of Rayleigh’s Diffraction Integral for Axial Points
Harold Osterberg,Luther W. Smith +1 more
TL;DR: In this paper, it is shown that the axial focal point of the converged spherical wave falls inside, at, or outside the geometrical focal point according to the angular semi-aperture θm of the lens.