The linearized, shallow-water equations with a constant rotation rate, f0, are [2] where u and v are the horizontal velocities and h is the instantaneous height of the free surface.
Using Fourier analysis, these equations can be combined to find the dispersion relation for Sverdrup waves: where k and l are the wavenumbers associated with the horizontal and vertical directions, and
), the horizontal velocities are found to be equal to This shows that the inclusion of rotation will cause the wave to develop oscillations at 90° to the wave propagation at the opposite phase.
In general, these are elliptical orbits that depend on the relative strength of gravity and rotation.
In the long wave limit, these are circular orbits characterized by inertial oscillations.