Abstract
Periodic rip currents on a wide planar beach are generated in the laboratory by shoaling water waves that are periodic in time and in two spatial directions: one normal (x direction) and one parallel (y direction) to the shoreline. These short‐crested waves propagate in water of uniform depth with nearly permanent form. They are described analytically by a family of solutions of the Kadomtsev‐Petviashvili (KP) equation (KP solutions of genus 2). During shoaling, genus 2 waves retain their spatial pattern past breaking, and they quickly generate periodic rip currents along the beach with a spacing of one‐half the y wavelength of the incident waves. KP theory also provides a plausible explanation and prediction for the narrow widths, relative to their longshore spacing, of rip currents generated in this manner. An estimate of their widths is one‐half the x wavelength of the incident waves.
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