This paper describes the results of the first computational investigation of characteristic visual complexity in the architecture of Peter Eisenman. The research uses a variation of the “box-counting” approach to determining a quantitative value of the formal complexity present in five of Eisenman’s early domestic works (Houses I, II, III, IV and VI all of which were completed between 1968 and 1976). The boxcounting approach produces an approximate fractal dimension calculation for the visual complexity of an architectural elevation. This method has previously been used to analyse a range of historic and modern buildings including the works of Frank Lloyd Wright, Eileen Gray, Le Corbusier and Kazuyo Sejima. Peter Eisenman’s early house desi...
Fractal analysis is a method for measuring, analysing and comparing the formal or geometric properti...
In 1996 Bovill applied Mandelbrot's fractal method for calculating the approximate' visual complexit...
This article contributes to clarifying the questions of whether and how fractal geometry, i.e., some...
This paper describes the results of the first computational investigation of characteristic visual c...
In recent years a computational variation of the “box-counting method” has been developed that can p...
In the late 1970s Mandelbrot argued that natural systems frequently possess characteristic geometric...
Relatively few quantifiable and objective methods exist for the analysis of architectural elevations...
Relatively few quantifiable and objective methods exist for the analysis of architectural elevations...
Past research over the last two decades has demonstrated that fractal analytical methods can be used...
This paper is the first investigation of the fractal dimensions of five of the house designs of Eile...
This paper is the first investigation of the fractal dimensions of five of the house designs of Eile...
Fractal geometry, emerging from Benoit Mandelbrot’s mathematical proposals in the late 1970’s, has e...
Fractal Geometry evolved in mathematics during the late 1970’s and early 1980’s; building on Benoit ...
In the late 1980’s and early 1990’s a range of approaches to using fractal geometry for the design a...
Fractal geometry was first used as a quantifiable method for analyzing the visual complexity of a bu...
Fractal analysis is a method for measuring, analysing and comparing the formal or geometric properti...
In 1996 Bovill applied Mandelbrot's fractal method for calculating the approximate' visual complexit...
This article contributes to clarifying the questions of whether and how fractal geometry, i.e., some...
This paper describes the results of the first computational investigation of characteristic visual c...
In recent years a computational variation of the “box-counting method” has been developed that can p...
In the late 1970s Mandelbrot argued that natural systems frequently possess characteristic geometric...
Relatively few quantifiable and objective methods exist for the analysis of architectural elevations...
Relatively few quantifiable and objective methods exist for the analysis of architectural elevations...
Past research over the last two decades has demonstrated that fractal analytical methods can be used...
This paper is the first investigation of the fractal dimensions of five of the house designs of Eile...
This paper is the first investigation of the fractal dimensions of five of the house designs of Eile...
Fractal geometry, emerging from Benoit Mandelbrot’s mathematical proposals in the late 1970’s, has e...
Fractal Geometry evolved in mathematics during the late 1970’s and early 1980’s; building on Benoit ...
In the late 1980’s and early 1990’s a range of approaches to using fractal geometry for the design a...
Fractal geometry was first used as a quantifiable method for analyzing the visual complexity of a bu...
Fractal analysis is a method for measuring, analysing and comparing the formal or geometric properti...
In 1996 Bovill applied Mandelbrot's fractal method for calculating the approximate' visual complexit...
This article contributes to clarifying the questions of whether and how fractal geometry, i.e., some...