Fractal scaling and the aesthetics of trees

Jingyi Gao, Mitchell Newberry
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Abstract

Trees in works of art have stirred emotions in viewers for millennia. Leonardo da Vinci described geometric proportions in trees to provide both guidelines for painting and insights into tree form and function. Da Vinci's Rule of trees further implies fractal branching with a particular scaling exponent $\alpha = 2$ governing both proportions between the diameters of adjoining boughs and the number of boughs of a given diameter. Contemporary biology increasingly supports an analogous rule with $\alpha = 3$ known as Murray's Law. Here we relate trees in art to a theory of proportion inspired by both da Vinci and modern tree physiology. We measure $\alpha$ in 16th century Islamic architecture, Edo period Japanese painting and 20th century European art, finding $\alpha$ in the range 1.5 to 2.5. We find that both conformity and deviations from ideal branching create stylistic effect and accommodate constraints on design and implementation. Finally, we analyze an abstract tree by Piet Mondrian which forgoes explicit branching but accurately captures the modern scaling exponent $\alpha = 3$, anticipating Murray's Law by 15 years. This perspective extends classical mathematical, biological and artistic ways to understand, recreate and appreciate the beauty of trees.
分形缩放与树木美学
达芬奇描述了树木的几何比例,既为绘画提供了指导,也让人们了解了树木的形态和功能。达-芬奇的树木法则进一步暗示了分形分枝,其特定的比例指数 $\alpha = 2$ 既管理着连接枝桠直径之间的比例,也管理着给定直径的枝桠数量。当代生物学越来越支持$\alpha = 3$的类似规则,即穆雷定律。在这里,我们将艺术中的树木与受达芬奇和现代树木生理学启发的比例理论联系起来。我们测量了 16 世纪伊斯兰建筑、江户时代日本绘画和 20 世纪欧洲艺术中的α值,发现α值在 1.5 到 2.5 之间。我们发现,与理想分支的一致性和偏差都会产生风格效果,并适应设计和实施上的限制。最后,我们分析了皮特-蒙德里安(Piet Mondrian)的一棵抽象树,这棵树放弃了明确的分枝,却准确地捕捉到了现代的缩放指数 $\alpha = 3$,比默里定律早了 15 年。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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