The Replacement Rule for Nonlinear Shallow Water Waves

Abstract

When a (1+1)-dimensional nonlinear PDE in real function η(x,t) admits localized traveling solutions we can consider L to be the average width of the envelope, A the average value of the amplitude of the envelope, and V the group velocity of such a solution. The replacement rule (RR or nonlinear dispersion relation) procedure is able to provide a simple qualitative relation between these three parameters, without actually solve the equation. Examples are provided from KdV, C-H and BBM equations, but the procedure appears to be almost universally valid for such (1+1)-dimensional nonlinear PDE and their localized traveling solutions 3.