It is shown that the paraxial Gaussian beam becomes the complex-source-point spherical wave when all-order corrections are made according to the method of Lax, Louisell, and McKnight. Apparent contradictions between previously published first-order corrections are also discussed
A virtual source that yields a family of a Pearcey wave is demonstrated. A closed-form expression is...
A new type of exact solutions of the full 3 dimensional spatial Helmholtz equation for the case of n...
International audienceDue to the growing number of publications and applications based on the exploi...
An accurate description of a radially polarized fundamental Gaussian beam is presented on the basis ...
A new mathematical model for the fundamental mode of a propagating Gaussian beam is presented. The m...
Based on the perturbative series representation of a complex-source-point spherical wave an expressi...
An exact decomposition of the diffracted field into a direct wave and a boundary diffraction wave is...
Summary. The Gaussian beam method has recently been introduced into synthetic seismology to overcome...
Geometric relations are used to study the propagation environment of a Gaussian beam wave propagatin...
Geometric relations are used to study the propagation environment of a Gaussian beam wave propagatin...
A very general beam solution of the paraxial wave equation in circular cylindrical coordinates is pr...
We investigate the linear propagation of Gaussian-apodized solutions to the paraxial wave equation i...
The Gaussian beam method of •erven9 et al. (1982) is an asymptotic method for the computation of wav...
We investigate the linear propagation of Gaussian-apodized solutions to the paraxial wave equation i...
The effectiveness of Gaussian Beams (GBs) to efficiently represent arbitrarily shaped antenna radiat...
A virtual source that yields a family of a Pearcey wave is demonstrated. A closed-form expression is...
A new type of exact solutions of the full 3 dimensional spatial Helmholtz equation for the case of n...
International audienceDue to the growing number of publications and applications based on the exploi...
An accurate description of a radially polarized fundamental Gaussian beam is presented on the basis ...
A new mathematical model for the fundamental mode of a propagating Gaussian beam is presented. The m...
Based on the perturbative series representation of a complex-source-point spherical wave an expressi...
An exact decomposition of the diffracted field into a direct wave and a boundary diffraction wave is...
Summary. The Gaussian beam method has recently been introduced into synthetic seismology to overcome...
Geometric relations are used to study the propagation environment of a Gaussian beam wave propagatin...
Geometric relations are used to study the propagation environment of a Gaussian beam wave propagatin...
A very general beam solution of the paraxial wave equation in circular cylindrical coordinates is pr...
We investigate the linear propagation of Gaussian-apodized solutions to the paraxial wave equation i...
The Gaussian beam method of •erven9 et al. (1982) is an asymptotic method for the computation of wav...
We investigate the linear propagation of Gaussian-apodized solutions to the paraxial wave equation i...
The effectiveness of Gaussian Beams (GBs) to efficiently represent arbitrarily shaped antenna radiat...
A virtual source that yields a family of a Pearcey wave is demonstrated. A closed-form expression is...
A new type of exact solutions of the full 3 dimensional spatial Helmholtz equation for the case of n...
International audienceDue to the growing number of publications and applications based on the exploi...
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