Wave collapse and instability of solitary waves of a generalized Kadomtsev-Petviashvili equation

This paper is concerned with traveling waves for the generalized Kadomtsev}Petviashvili equation (w y)31, t31, i.e. solutions of the form w(t, , y)"u( !ct, y). We study both, solutions periodic in x" !ct and solitary waves, which are decaying in x, and their interrelations. In particular, we prove

We study linear instability of solitary wave solutions of a one-dimensional generalized Benney-Luke equation, which is a formally valid approximation for describing two-way water wave propagation in the presence of surface tension. Further, we implement a finite difference numerical scheme which com

This paper studies the orbital stability and instability of solitary wave solutions of the generalized symmetric regularizedlong-wave equations. It is shown that a traveling wave may be stable or unstable depending on the nonlinearity and the range of the wave's speed of propagation. Sharp condition