Abstract
An analytical solution to the problem of the generation of long waves by periodic surface pressures in a confined basin has been derived in the framework of linear theory. If the change in the basin depth follows a paraboloidal law, being reduced to zero at the borders, the surface pressure amplitude is a power function of the space coordinate; dissipation and the Coriolis force are considered. Resonance frequencies have been determined, and the effect of forces upon the wave amplitude in the resonance domain has been investigated.
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