In this paper, we emphasize three different techniques for the growth of fractal trees with a desired fractal dimension D-f. The three different growths are due to the influence of (i) stretched branches, (ii) dead ends, or (iii) a variable branching rate. Several examples are given. We point out that geometrical and physical properties (skeleton dimension, percolation exponents, self-avoiding walk) of fractal tress depend strongly on their type. The most striking result is that the critical exponents at the percolation transition are nonuniversal since they depend on the tree type. The critical exponents depend on D-f for trees of types (ii) and (iii)
Fractals are everywhere. Fractals relate to many different branches of science and mathematics. They...
This article discusses the interplay in fractal geometry occurring between computer programs for dev...
Branching trees and bushes are obtained from a segment by an infinite sequence of two elementary tra...
Abstract We characterize the existence of certain geometric configurations in the fractal percolati...
We relate the fractal dimension of the backbone, and the spectral dimension of Eden trees to the dyn...
Burda Z, Erdmann J, Petersson B, Wattenberg M. Exotic trees. Physical Review E. 2003;67(2):26105.We ...
We study critical exponents of self-avoiding walks on a family of finitely ramified Sierpinki-type f...
In the 18th and 19th centuries the branch of mathematics that would later be known as fractal geomet...
Employing highly efficient algorithms for simulating invasion percolation (IP) with trapping, we obt...
We study critical exponents of self-avoiding walks on a family of finitely ramified Sierpinki-type f...
This article discusses the interplay in fractal geometry occuring between computer programs for deve...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
We study asymptotic properties of diffusion and other transport processes (including self-avoiding w...
The role of Fractal Geometry as an extension of Classical Geometry has become increasingly important...
We propose a general model of unweighted and undirected networks having the scale-free property and ...
Fractals are everywhere. Fractals relate to many different branches of science and mathematics. They...
This article discusses the interplay in fractal geometry occurring between computer programs for dev...
Branching trees and bushes are obtained from a segment by an infinite sequence of two elementary tra...
Abstract We characterize the existence of certain geometric configurations in the fractal percolati...
We relate the fractal dimension of the backbone, and the spectral dimension of Eden trees to the dyn...
Burda Z, Erdmann J, Petersson B, Wattenberg M. Exotic trees. Physical Review E. 2003;67(2):26105.We ...
We study critical exponents of self-avoiding walks on a family of finitely ramified Sierpinki-type f...
In the 18th and 19th centuries the branch of mathematics that would later be known as fractal geomet...
Employing highly efficient algorithms for simulating invasion percolation (IP) with trapping, we obt...
We study critical exponents of self-avoiding walks on a family of finitely ramified Sierpinki-type f...
This article discusses the interplay in fractal geometry occuring between computer programs for deve...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
We study asymptotic properties of diffusion and other transport processes (including self-avoiding w...
The role of Fractal Geometry as an extension of Classical Geometry has become increasingly important...
We propose a general model of unweighted and undirected networks having the scale-free property and ...
Fractals are everywhere. Fractals relate to many different branches of science and mathematics. They...
This article discusses the interplay in fractal geometry occurring between computer programs for dev...
Branching trees and bushes are obtained from a segment by an infinite sequence of two elementary tra...