In The Fractal Geometry of Nature Benoit B. Mandelbrot points out that the shapes and textures of nature do not fit the rigid restrictions of standard Euclidean geometry. Clouds are not ellipsoids, planets are not spheres. Instead, natural systems, from river networks to human bronchial passages, are irregular and of a much higher level of complexity. Likewise, planets, stars and galaxies are not distributed throughout the universe according to any simple patterns
Benoit B. Mandelbrot, who advanced the concept of power law scaling as a fundamental property of a b...
If you read these pages, you certainly know the seminal book by Benoit B. Mandelbrot, The Fractal Ge...
Fractals have experienced considerable success in quantifying the complex structure exhibited by man...
Objects in nature are often very irregular, so that, within the constraints of Euclidean geometry, o...
Fractal geometry, largely inspired by Benoit Mandelbrot [1] during the sixties and seventies, is one...
Euclid was one of the first who attempted to explain natural phenomena in terms of mathematical conc...
The beautiful image that you see on the cover is a fractal, a recent entrant into the world of mathe...
The Scottish biologist D’Arcy once said “God always geometrizes.” The idea behind this statement is ...
Fractals are everywhere. Fractals relate to many different branches of science and mathematics. They...
The term fractal was first coined by the Polish-born, French-American mathe- matician Benoît Mandelb...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
Classical geometry has, for a long time, been used to shape our understanding of the natural world. ...
What are fractals? Mathematicians like to make simple models to understand and advance the world aro...
It has become evident that fractals are not to be tied down to one compact, Webster-style, paragraph...
A pedagogical treatment is given on how the euclidean geometry can be used to describe complex and f...
Benoit B. Mandelbrot, who advanced the concept of power law scaling as a fundamental property of a b...
If you read these pages, you certainly know the seminal book by Benoit B. Mandelbrot, The Fractal Ge...
Fractals have experienced considerable success in quantifying the complex structure exhibited by man...
Objects in nature are often very irregular, so that, within the constraints of Euclidean geometry, o...
Fractal geometry, largely inspired by Benoit Mandelbrot [1] during the sixties and seventies, is one...
Euclid was one of the first who attempted to explain natural phenomena in terms of mathematical conc...
The beautiful image that you see on the cover is a fractal, a recent entrant into the world of mathe...
The Scottish biologist D’Arcy once said “God always geometrizes.” The idea behind this statement is ...
Fractals are everywhere. Fractals relate to many different branches of science and mathematics. They...
The term fractal was first coined by the Polish-born, French-American mathe- matician Benoît Mandelb...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
Classical geometry has, for a long time, been used to shape our understanding of the natural world. ...
What are fractals? Mathematicians like to make simple models to understand and advance the world aro...
It has become evident that fractals are not to be tied down to one compact, Webster-style, paragraph...
A pedagogical treatment is given on how the euclidean geometry can be used to describe complex and f...
Benoit B. Mandelbrot, who advanced the concept of power law scaling as a fundamental property of a b...
If you read these pages, you certainly know the seminal book by Benoit B. Mandelbrot, The Fractal Ge...
Fractals have experienced considerable success in quantifying the complex structure exhibited by man...