The Fractal Dimension of Architecture

The book applies the box counting method for computing fractal dimension, via the ArchImage software system, to compute a fractal dimension from architectural drawings (elevations and floor plans) of buildings, drawn at multiple levels of detail. The results of the book suggest that the results are consistent enough to allow for comparisons from one building to another, as long as the general features of the images (such as margins, line thickness, and resolution), parameters of the box counting algorithm, and statistical processing of the results are carefully controlled.{{r|ems|zbl}}

The first five chapters of the book introduce fractals and the fractal dimension, and explain the methodology used by the authors for this analysis, also applying the same analysis to classical fractal structures including the Apollonian gasket, Fibonacci word, Koch snowflake, Minkowski sausage, pinwheel tiling, terdragon, and Sierpiński triangle.{{r|maa}} The remaining six chapters explain the authors' choice of buildings to analyze, apply their methodology to 625 drawings from 85 homes, built between 1901 and 2007, and perform a statistical analysis of the results.{{r|ems|maa|mr}}

The authors use this technique to study three main hypotheses, with a fractal structure of subsidiary hypotheses depending on them. These are

• That the decrease in the complexity of social family units over the period of study should have led to a corresponding decrease in the complexity of their homes, as measured by a reduction in the fractal dimension.
• That distinctive genres and movements in architecture can be characterized by their fractal dimensions, and
• That individual architects can also be characterized by the fractal dimensions of their designs.

The first and third hypotheses are not convincingly supported by the analysis, but the results suggest further work in these directions. The second hypothesis, on distinctive fractal descriptions of genres and movements, does not appear to be true, leading the authors to weaker replacements for it.{{r|ems|zbl|maa}}

The book is aimed at architects and architecture students; its mathematical content is not deep, and it does not require much mathematical background of its readers.{{r|ems|maa}} Reviewer Joel Haack suggests that it could also be used for general education courses in mathematics for liberal arts undergraduates.{{r|maa}}

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• Vaughan, Josephine and Ostwald, Michael J. (2022) [https://www.researchgate.net/publication/353340747_Measuring_the_geometry_of_nature_and_architecture_comparing_the_visual_properties_of_Frank_Lloyd_Wright's_Fallingwater_and_its_natural_setting Measuring the geometry of nature and architecture: comparing the visual properties of Frank Lloyd Wright's Fallingwater and its natural setting] Open House International 47(1):51-67
• Vaughan, Josephine., Ostwald, Michael J., and Tucker, Chris (2015) [https://www.researchgate.net/publication/271197753_Characteristic_Visual_Complexity_Fractal_dimensions_in_the_architecture_of_Frank_Lloyd_Wright_and_Le_Corbusier Characteristic visual complexity: Fractal dimensions in the architecture of frank lloyd wright and le corbusier] In Architecture and Mathematics, From Antiquity to the Future. Volume II: 1500s to the Future. Eds. Kim Williams, Michael J. Ostwald. Chapter 69. Basel/Cham, Birkhauser/Springer
• Vaughan, Josephine and Ostwald, Michael J. (2014) [https://www.researchgate.net/publication/264673143_Measuring_the_significance_of_facade_transparency_in_Australian_regionalist_architecture_A_computational_analysis_of_10_designs_by_Glenn_Murcutt Measuring the significance of façade transparency in Australian regionalist architecture: A computational analysis of 10 designs by Glenn Murcutt] Architectural Science Review 57(4):249-259
• Vaughan, Josephine and Ostwald, Michael J. (2010) [https://papers.cumincad.org/cgi-bin/works/paper/caadria2010_003 Refining a computational fractal method of analysis: Testing Bovill's architectural data] Proceedings of the 15th International Conference on Computer Aided Architectural Design Research in Asia, pp. 29-38
• Ostwald, Michael J. and Vaughan, Josephine (2010) [https://www.researchgate.net/publication/256058328_The_mathematics_of_style_in_the_architecture_of_Frank_Lloyd_Wright_A_computational_fractal_analysis_of_formal_complexity_in_fifteen_domestic_designs The mathematics of style in the architecture of Frank Lloyd Wright: A computational, fractal analysis of formal complexity in fifteen domestic designs] In Built Environment: Design Management and Applications Ed.Paul S Geller. Hauppauge, NOVA Science

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{{reflist|refs=

{{citation|first=Adhemar|last=Bultheel|authorlink=Adhemar Bultheel|journal=EMS Reviews|publisher=European Mathematical Society|url=https://euro-math-soc.eu/review/fractal-dimension-architecture|date=December 2016|title=Review of The Fractal Dimension of Architecture}}

{{citation|first=Joel|last=Haack|url=https://www.maa.org/press/maa-reviews/the-fractal-dimension-of-architecture|title=Review of The Fractal Dimension of Architecture|journal=MAA Reviews|publisher=Mathematical Association of America|date=February 2018}}

{{citation|first=Elena|last=Hadzieva|title=Review of The Fractal Dimension of Architecture|journal=Mathematical Reviews|mr=3586586}}

{{citation|first=Malgorzata|last=Marciniak|title=Review of The Fractal Dimension of Architecture|journal=zbMATH|zbl=1365.00022}}

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Category:Fractals

Category:Architecture books

Category:Mathematics books

Category:2016 non-fiction books

Category:Birkhäuser books