KAM理论自上世纪60年代提出以来，受到了广泛的研究. 本项目准备研究平面扭转映射理论以及它的应用，具体包括以下几方面：1、非单调扭转映射的相关研究；2、平面拟周期扭转映射的不变曲线的存在性研究；3、平面概周期扭转映射的不变曲线的存在性研究；4、平面拟/概周期扭转映射的Aubry-Mather集的相关研究；5、把这些理论结果应用到非对称振动、不满足扭转条件的碰撞系统以及具有奇异势能的相对振子等.

KAM theory has been extensively studied since 1960s. The project focuses on the theory on the twist mappings in the plane and its applications, including the research on the non-twist mappings, the existence of invariant curves on quasi-periodic/almost periodic twist mappings in the plane, Aubry-Mather sets for quasi-periodic/almost periodic twist mappings, and their applications to asymmetric oscillators, impact systems without the twist condition, the relativistic oscillators with singular potentials, and so on.