Add to ORKGTheoretical and experimental aspects of the diffraction of gaussian laser beams by the straight edge bounding an opaque plane are investigated. Theoretical analysis is based upon the Kirchhoff scalar wave theory in the Fresnel limit, assuming an incident electromagnetic field having spatial amplitude and phase variation appropriate to a fundamental-mode gaussian beam. Experimental observation consisting of irradiance as a function of position is in good agreement with this theory. Both theoretical and experimental results are found to depend strongly on gaussian-beam parameters
The natural phenomenon of waves bending around obstacles is diffraction. Spatial characteristics of ...
The diffraction field of a wave beam from a circular aperture is obtailled by using the Kirchhoff ap...
Most authors include a paraxial (small-angle) limitation in their discussion of diffracted wave fiel...
Hertz vector diffraction theory is applied to a focused TEM00 Gaussian light field passing through a...
PART I. Closed form solutions have been derived for the focal plane diffraction patterns of (a) a c...
In the diffraction pattern produced by a half-plane sharp edge when it obstructs the passage of a la...
Closed-form solutions have been derived for the diffraction patterns at the focal plane of (1) a con...
A rigorous modal theory for the diffraction of Gaussian beams from N slits in an otherwise perfectly...
A “genuinely” paraxial version of Miyamoto-Wolf's theory aimed at dealing with sharp-edge diffractio...
In the diffraction pattern produced by a half-plane sharp edge when it obstructs the passage of a la...
Gaussian beam mode analysis (GBMA) offers a more intuitive physical insight into how light beams evo...
The Kirchhoff integral for diffraction in the near-forward direction is derived from the exact solut...
Abstract: The paper deals with scalar diffraction theory and introduces an important solution of wav...
AbstractUsing the idea of the angular spectral plane-wave expansion all the basic parameters of mono...
Goodman\u27s popular linear systems formulation of scalar diffraction theory includes a paraxial (sm...
The natural phenomenon of waves bending around obstacles is diffraction. Spatial characteristics of ...
The diffraction field of a wave beam from a circular aperture is obtailled by using the Kirchhoff ap...
Most authors include a paraxial (small-angle) limitation in their discussion of diffracted wave fiel...
Hertz vector diffraction theory is applied to a focused TEM00 Gaussian light field passing through a...
PART I. Closed form solutions have been derived for the focal plane diffraction patterns of (a) a c...
In the diffraction pattern produced by a half-plane sharp edge when it obstructs the passage of a la...
Closed-form solutions have been derived for the diffraction patterns at the focal plane of (1) a con...
A rigorous modal theory for the diffraction of Gaussian beams from N slits in an otherwise perfectly...
A “genuinely” paraxial version of Miyamoto-Wolf's theory aimed at dealing with sharp-edge diffractio...
In the diffraction pattern produced by a half-plane sharp edge when it obstructs the passage of a la...
Gaussian beam mode analysis (GBMA) offers a more intuitive physical insight into how light beams evo...
The Kirchhoff integral for diffraction in the near-forward direction is derived from the exact solut...
Abstract: The paper deals with scalar diffraction theory and introduces an important solution of wav...
AbstractUsing the idea of the angular spectral plane-wave expansion all the basic parameters of mono...
Goodman\u27s popular linear systems formulation of scalar diffraction theory includes a paraxial (sm...
The natural phenomenon of waves bending around obstacles is diffraction. Spatial characteristics of ...
The diffraction field of a wave beam from a circular aperture is obtailled by using the Kirchhoff ap...
Most authors include a paraxial (small-angle) limitation in their discussion of diffracted wave fiel...