In this paper we show that the massive parallelism, the synchronous appli- cation of the rules, and the discrete nature of their computation, among other features, lead us to consider P systems as natural tools for dealing with fractals. Several examples of fractals encoded by P systems are presented and we wonder about using P systems as a new tool for representing and simulating the fractal nature of tumors.Ministerio de Eduación y Ciencia TIN2005-09345-C04-0
The shapes of rain cells as they are recorded by meteorological radar can appear chaotic, especially...
This volume is based upon the presentations made at an international conference in London on the sub...
Fractal structures containing relief surfaces have applications in a variety of fields, including co...
Objects in nature are often very irregular, so that, within the constraints of Euclidean geometry, o...
A fractal is a mathematical pattern that has several distinct features. Firstly, it must exhibit sel...
A fractal is a mathematical object, that can be split into several parts, each of which is a minuscu...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
Fractal geometry, largely inspired by Benoit Mandelbrot [1] during the sixties and seventies, is one...
The idea of fractals is relatively new, but their roots date back to 19th century mathematics. A fra...
What are fractals? Mathematicians like to make simple models to understand and advance the world aro...
AbstractThe notion of P-interpreted top-down tree generators is introduced, combining the nondetermi...
This is the author's version of the work. It is posted here for your personal use. Not for redistrib...
Fractals are objects, have the property of a system scale invariance or self-similarity. These objec...
Fractals are everywhere. Fractals relate to many different branches of science and mathematics. They...
The shapes of rain cells as they are recorded by meteorological radar can appear chaotic, especially...
This volume is based upon the presentations made at an international conference in London on the sub...
Fractal structures containing relief surfaces have applications in a variety of fields, including co...
Objects in nature are often very irregular, so that, within the constraints of Euclidean geometry, o...
A fractal is a mathematical pattern that has several distinct features. Firstly, it must exhibit sel...
A fractal is a mathematical object, that can be split into several parts, each of which is a minuscu...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
Fractal geometry, largely inspired by Benoit Mandelbrot [1] during the sixties and seventies, is one...
The idea of fractals is relatively new, but their roots date back to 19th century mathematics. A fra...
What are fractals? Mathematicians like to make simple models to understand and advance the world aro...
AbstractThe notion of P-interpreted top-down tree generators is introduced, combining the nondetermi...
This is the author's version of the work. It is posted here for your personal use. Not for redistrib...
Fractals are objects, have the property of a system scale invariance or self-similarity. These objec...
Fractals are everywhere. Fractals relate to many different branches of science and mathematics. They...
The shapes of rain cells as they are recorded by meteorological radar can appear chaotic, especially...
This volume is based upon the presentations made at an international conference in London on the sub...
Fractal structures containing relief surfaces have applications in a variety of fields, including co...