Keywords: 
• 辅助方程 /
• 非线性发展方程 /
• Bcklund变换 /
• 类孤子新精确解

Abstract: The auxiliary equation method is used to construct the finite new exact solutions of nonlinear evolution equations. To search for infinite sequence soliton-like exact solutions of nonlinear evolution equations, characteristics of constructivity and mechanization of auxiliary equation method are analyzed and summarized. Therefore, the quasi-B~icklund transformation between new solutions of a kind of auxiliary equation with Riccati equation is presented, then （2＋l）-dimensional modified dispersive water-wave system is taken as an applicable example to find infinite sequence soliton-like new exact solutions by choosing two kinds of formal solutions of nonlinear evolution equations with the help of symbolic computation system Mathematica, where included are the infinite sequence smooth soliton-like solutions, compact soliton solutions and peak stilton-like solutions.