Solitonic solutions for the generalized two-velocity Boltzmann equation

A unique, simple, and general analytical solution for the nonlinear Poisson-Boltzmann equation in semiinfinite planar symmetry with any unmixed electrolyte is reported. This is an exact solution for symmetrical and z-2z/2z-z asymmetrical electrolytes and an approximate solution for other asymmetrica

The most elementary ansatz of the double-Exp-function method for finding exact doublewave solutions can be produced by an extension of a two-soliton ansatz in a fractional form. The generalized Burgers equation is used as an example, and closed form analytic multi-soliton solutions are obtained for

This paper obtains the 1-soliton solution of the Bðm; nÞ equation, that is the generalized form of the Boussinesq equation, with generalized evolution term. The solitary wave ansatz is used to obtain the solution. The four exhaustive cases, depending on the parameters, are considered.