分形
系列(地层学)
自相似性
网络的分形维数
统计物理学
相似性(几何)
数学
比例(比率)
Minkowski–Boul尺寸
分形景观
单位时间间隔
分形导数
分形分析
数学分析
几何学
分形维数
物理
人工智能
计算机科学
生物
图像(数学)
量子力学
古生物学
标识
DOI:10.1016/0167-2789(88)90081-4
摘要
We present a technique to measure the fractal dimension of the set of points (t, f(t)) forming the graph of a function f defined on the unit interval. First we apply it to a fractional Brownian function [1] which has a property of self-similarity for all scales, and we can get the stable and precise fractal dimension. This technique is also applied to the observational data of natural phenomena. It does not show self-similarity all over the scale but has a different self-similarity across the characteristic time scale. The present method gives us a stable characteristic time scale as well as the fractal dimension.
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