B. M. Rodr\'\iguez-Lara
Published 2011-01-17Version 1
Integral transforms arising from the separable solutions to the Helmholtz differential equation are presented. Pairs of these integral transforms are related via Plancherel theorem and, ultimately, any of these integral transforms may be calculated using only Fourier transforms. This result is used to evaluate the mean value of momenta associated to the symmetries of the reduced wave equation. As an explicit example, the orbital angular momenta of plane and elliptic-cylindrical waves is presented.
Some inequalities for the Fourier transform and their limiting behaviour
The Fourier transform and convolutions generated by a differential operator with boundary condition on a segment
The Fourier transform and the wave equation
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