A numerical method for non-linear water waves

An ecient numerical method is developed for the numerical solution of non-linear wave equations typi®ed by the third-and ®fth-order Korteweg±de Vries equations and their generalizations. The method developed uses a pseudo-spectral (Fourier transform) treatment of the space dependence together with a

## Abstract A boundary integral equation method is used to compute the forces acting on bodies oscillating at or near the free surface of a fluid. This method relies on the use of a Green function representing the potential of a unit pulsating source beneath the free surface. A peculiarity of the b

Two numerical methods for studying nonlinear interactions between spatially periodic water waves of disparate length scales are explored. Both use a time-stepping procedure, but one solves the boundary value problem at each time step by a boundary integral equation and the other uses a high-order sp