Links between some (2 + 1)-dimensional nonlinear evolution equations and Painlevé-II equations

Two new 2 + 1 dimensional nonlinear evolution equations are presented. The 2 + 1 dimensional equations closely relate with a hierarchy of 1 + 1 dimensional soliton equations. Through nonlinearizing of Lax pairs, the 1 + 1 dimensional evolution equations are decomposed to the finite dimensional integ

Starting from the standard truncated Painlev e e expansion, a B€ a acklund transformation for the (2 + 1)-dimensional breaking soliton equation is derived. Making use of the variable separation approach, a variable separation solution of this model is obtained. By selecting appropriate multi-valued

With the aid of symbolic computation, the new generalized algebraic method is extended to the (1 + 2)-dimensional nonlinear Schrödinger equation (NLSE) with dualpower law nonlinearity for constructing a series of new exact solutions. Because of the dual-power law nonlinearity, the equation cannot be

A method is proposed by extending the linear traveling wave transformation into the nonlinear transformation with the (G 0 /G)-expansion method. The non-traveling wave solutions with variable separation can be constructed for the (2 + 1)-dimensional Broer-Kaup equations with variable coefficients vi