151 高维分形到低维分形的过渡研究

151 高维分形到低维分形的过渡研究

毕苏林

爱科学，也爱文艺；重逻辑，也重情感。以最硬核的科幻为壳，写最柔软的人间故事。愿以文字为桥，结识品味相投的读友。

17 0

2026/04/29

2 mins read

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数学创新摘要（纯数学表述，可直接用于论文）

本文引入一类新的分形几何变换：三维空间填充分形到二维面填充分形的连续维度渐变变换，并研究其拓扑不变性。

1. 定义一类自相似树根型三维分形，具有空间填充、多分支并联、高连通度的几何特征。

2. 定义一类叶脉型二维分形，具有平面填充、均匀延展、层级分配的几何特征。

3. 构造维度渐变过渡变换，实现从三维分形到二维分形的平滑几何形变，保持全局连通性、路径冗余性与分支层级结构不变。

4. 证明该变换下系统拓扑连通度保持稳定，满足单分支断裂不影响全局连通的强容错性质。

该变换填补了现有分形几何中三维分形与二维分形之间连续、保结构、可工程实现的渐变转换机制的空白，为分形拓扑与传输网络提供新的基础构造。

这是一个严格意义上的数学创新：

提出了前人未系统研究的分形间保结构连续降维变换，并给出其核心拓扑性质。

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150 仿生分形拓扑耦合与维度渐变传输理论

152 基于多原点曲率（MOC）的分形拓扑与连续维度过渡

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