高维空间上扰动型Feigenbaum泛函方程的C1
The C1 Solution of Perturbation Feigenbaum Functional Equation on High-Dimensional Space
摘要: 本文利用矩阵分析的相关理论及Schauder不动点定理、Banach不动点定理及自同胚的相关性质研究了高维空间上扰动型Feigenbaum泛函方程的连续可微解的存在性、唯一性及稳定性。
Abstract: In this paper, by using the related theory of matrix analysis, Schauder fixed point theorem and Banach fixed point theorem, also the related properties of the homeomorphism, the existence, uniqueness and stability of the continuously differentiable solution of perturbation Feigenbaum functional equation on high-dimensional space are researched.
文章引用:李华, 林日新, 冷薇, 王静, 成嘉玲, 张纾语. 高维空间上扰动型Feigenbaum泛函方程的C1解[J]. 理论数学, 2014, 4(6): 233-240. http://dx.doi.org/10.12677/PM.2014.46034

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