Furthermore, we obtain a sufficient condition by which we can distinguish if an ordinary differntial system is a continuous ergodicsystem.
进一步我们也给出判别一个常微系统是连续遍历系统的充分条件。
2
Roughly speaking, dynamical systems consist of differential dynamical system, topological dynamical system, infinite dimensional dynamical system, complex dynamical system and ergodic theory etc.
今天的动力系统大致可分为微分动力系统、拓扑动力系统、无穷维动力系统、复动力系统、遍历论等方向。
3
In this paper we give the properties and structure of eigenfunctions and eigenvalues of the weakly ergodic homeomorphism on compact system.