Dynamic problems for the sine-gordon equation with variable coefficients. Exact solutions

In this paper, the generalized nonlinear Schro ¨dinger equation with variable coefficients is studied. First, exact gray one-soliton solution in explicit form is obtained by using the complex amplitude ansatz method. Second, the multisoliton solutions are constructed through suitable mapping and the

This paper deals with diffusion problems modeled by the equation a(t)u=x = ut, x > 0, t > O, u(x, O) = c(x) together with the boundary condition u(0, t) = b(t) or ux(O, t) = b(t). By using Fourier transforms, existence conditions and exact solutions of the above mixed problems are given.

In this short letter, with the aid of symbolic computational system Mathematic, new exact solutions including kink solutions, soliton-like solutions and periodic form solutions for a generalized Zakharov-Kuznetsov equation with variable coefficients are obtained using the generalized Riccati equatio