Many problems of dynamical systems can be reduced to an iterative functional equation.
动力系统的许多问题都可以化为迭代函数方程。
This paper is concerned with an analytic invariant curves on a planar mapping of the iterative functional equation.
研究了复合迭代函数方程所代表的一类不变曲线的解析解,通过构造辅助方程的幂级数解,从而获得原方程的解析解。
In chapter 2, three kinds of planar mappings are discussed. We reduce the existence of analytic invariant curves of iterative functional equation by means of majorant series.
本文的第二章讨论了三类平面映射的解析不变曲线,用优级数方法讨论了不变曲线迭代函数方程解析解的存在性。
Many mathematical models in physics, mechanics, biology and astronomy are given in such forms. Many problems of dynamical systems can be reduced to an iterative functional equation.
许多物理学、力学、生物学以及天文学问题的数学模型都是由连续的或离散的迭代过程描述的。
Without any functional expansions, accurate orientational distribution functions are obtained by using a newly iterative method to solve the equation of equilibrium state.
不用任何函数展开,通过迭代方法求解平衡态方程,得到精确的取向分布函数。
Many problems of dynamical systems can be reduced to an iterative functional differential equation.
动力系统的许多问题都可以化为迭代泛函微分方程。
Many problems of dynamical systems can be reduced to an iterative functional differential equation.
动力系统的许多问题都可以化为迭代泛函微分方程。
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