AbstractThe geometry of coastlines, based on an empirical study by Lewis Richardson, is presented as a way of introducing the subject of fractals developed by Benoit Mandelbrot. It is shown how the statistically self-similar nature of coastlines can be generalized to an interesting class of point sets, curves and surfaces with the same property. Brownian and fractional Brownian motion are introduced as ways of generating statistically self-similar curves with the appearance of coastlines and mountain ranges
lica he ctal s, riz enome d, man 0; Fris there h great n viours ematic icate o fluid mechanics. To t...
Fractal geometry is expected to provide a new quantitative way to express a certain property of land...
It has become evident that fractals are not to be tied down to one compact, Webster-style, paragraph...
AbstractThe geometry of coastlines, based on an empirical study by Lewis Richardson, is presented as...
Application of fractal geometry on emerged and submerged coastlines of the Sorrento Peninsula (Tyrrh...
Objects in nature are often very irregular, so that, within the constraints of Euclidean geometry, o...
This paper presents a study case involving the influence of resolution on estimative of the Fractal ...
This text is intended for the general public. The aim of this work is acquaint readers with foundati...
Fractal geometry, largely inspired by Benoit Mandelbrot [1] during the sixties and seventies, is one...
The fractal dimensions of China's coastlines are preliminarily discussed on the basis of GIS in...
We show that rocky shorelines with fractal dimension 4/3 are conformally invariant curves by measuri...
Fractal theory was applied to a preliminary discussion of the fractal character and formation mechan...
The Scottish biologist D’Arcy once said “God always geometrizes.” The idea behind this statement is ...
In the 18th and 19th centuries the branch of mathematics that would later be known as fractal geomet...
Classical geometry has, for a long time, been used to shape our understanding of the natural world. ...
lica he ctal s, riz enome d, man 0; Fris there h great n viours ematic icate o fluid mechanics. To t...
Fractal geometry is expected to provide a new quantitative way to express a certain property of land...
It has become evident that fractals are not to be tied down to one compact, Webster-style, paragraph...
AbstractThe geometry of coastlines, based on an empirical study by Lewis Richardson, is presented as...
Application of fractal geometry on emerged and submerged coastlines of the Sorrento Peninsula (Tyrrh...
Objects in nature are often very irregular, so that, within the constraints of Euclidean geometry, o...
This paper presents a study case involving the influence of resolution on estimative of the Fractal ...
This text is intended for the general public. The aim of this work is acquaint readers with foundati...
Fractal geometry, largely inspired by Benoit Mandelbrot [1] during the sixties and seventies, is one...
The fractal dimensions of China's coastlines are preliminarily discussed on the basis of GIS in...
We show that rocky shorelines with fractal dimension 4/3 are conformally invariant curves by measuri...
Fractal theory was applied to a preliminary discussion of the fractal character and formation mechan...
The Scottish biologist D’Arcy once said “God always geometrizes.” The idea behind this statement is ...
In the 18th and 19th centuries the branch of mathematics that would later be known as fractal geomet...
Classical geometry has, for a long time, been used to shape our understanding of the natural world. ...
lica he ctal s, riz enome d, man 0; Fris there h great n viours ematic icate o fluid mechanics. To t...
Fractal geometry is expected to provide a new quantitative way to express a certain property of land...
It has become evident that fractals are not to be tied down to one compact, Webster-style, paragraph...