The sufficient and necessary conditions of existing generalized Miura transformation between KdV and generalized MKdV equations and transformation formulas between Heisenberg equations and new Heisenberg equations are obtained by using homomorphisms of Lie symmetry groups.

Studied the(2+1)-dimensional nonlinear Klein-Gordon equations by using of the Lie group of symmetry,obtained it\'s one-dimensional optimal system.

By Lee symmetry of the theory,the approach is given to select the auxiliary operator of a linear in homotopy analysis method.

This paper mainly studies the applications of Lie symmetry methods to solve differential equations.