This paper is about the beauty of fractals and the surprising con-nections between them. We will explain the pioneering role that the Sierpinski triangle plays in the Ulam-Warburton automata and show you a number of pictures along the way.
What are fractals? Mathematicians like to make simple models to understand and advance the world aro...
Fractals fascinates both academics and art lovers. They are a form of chaos. A key feature that dist...
The mathematical concept of fractal penetrates not only into numerous scientific fields, but also in...
We generalize the construction of the ordinary Sierpinski triangle to obtain a two-parameter family ...
Abstract. In this paper, we consider a large variety of solutions for the generation of Sierpinski t...
The idea of fractals is relatively new, but their roots date back to 19th century mathematics. A fra...
It is well-known that the spacetime diagrams of some cel-lular automata have a fractal structure: fo...
Big open problems in science and mathematics have a way of surprisingly showing up in simple puzzles...
The Sierpinski triangle also known as Sierpinski gasket is one of the most interesting and the simpl...
The Abelian Sandpile Model, seen as a deterministic lattice automaton, on two-dimensional periodic g...
A fractal is a mathematical pattern that has several distinct features. Firstly, it must exhibit sel...
In an article published in the November 2016 issue of At Right Angles we had seen how geometrical fr...
Looking at Pascal\u27s Triangle there are many patterns that arise and phenomena that happen. Consid...
Self-similar fractal structures are of fundamental importance in science, mathematics, and aesthetic...
A fractal is a mathematical set that typically displays self-similar patterns, which means it is "th...
What are fractals? Mathematicians like to make simple models to understand and advance the world aro...
Fractals fascinates both academics and art lovers. They are a form of chaos. A key feature that dist...
The mathematical concept of fractal penetrates not only into numerous scientific fields, but also in...
We generalize the construction of the ordinary Sierpinski triangle to obtain a two-parameter family ...
Abstract. In this paper, we consider a large variety of solutions for the generation of Sierpinski t...
The idea of fractals is relatively new, but their roots date back to 19th century mathematics. A fra...
It is well-known that the spacetime diagrams of some cel-lular automata have a fractal structure: fo...
Big open problems in science and mathematics have a way of surprisingly showing up in simple puzzles...
The Sierpinski triangle also known as Sierpinski gasket is one of the most interesting and the simpl...
The Abelian Sandpile Model, seen as a deterministic lattice automaton, on two-dimensional periodic g...
A fractal is a mathematical pattern that has several distinct features. Firstly, it must exhibit sel...
In an article published in the November 2016 issue of At Right Angles we had seen how geometrical fr...
Looking at Pascal\u27s Triangle there are many patterns that arise and phenomena that happen. Consid...
Self-similar fractal structures are of fundamental importance in science, mathematics, and aesthetic...
A fractal is a mathematical set that typically displays self-similar patterns, which means it is "th...
What are fractals? Mathematicians like to make simple models to understand and advance the world aro...
Fractals fascinates both academics and art lovers. They are a form of chaos. A key feature that dist...
The mathematical concept of fractal penetrates not only into numerous scientific fields, but also in...