The famous fractal set called the Sierpiński triangle was introduced as a plane curve every point of which is the point of ramification. Since it satisfies the Jordan definition of a curve, it can be represented by two continuous coordinate functions of a parameter. The coordinate functions are constructed by iterations of a system of linear transformations in the complex plane
Self-similar fractal structures are of fundamental importance in science, mathematics, and aesthetic...
AbstractWe present a topological characterization of the Sierpiński triangle. This answers question ...
In this paper, we give a few results on the local behavior of harmonic functions on the Sierpinski t...
The Sierpinski triangle also known as Sierpinski gasket is one of the most interesting and the simpl...
The classical Sierpinski Gasket defined on the equilateral triangle is a typical example of fractals...
Abstract. In this paper, we consider a large variety of solutions for the generation of Sierpinski t...
We generalize the construction of the ordinary Sierpinski triangle to obtain a two-parameter family ...
This paper focuses on the original articles written by Waclaw Sierpinski in 1915, when he introduced...
This article is a continuation of a previous work which dealt with the inversion of a Sierpinski tri...
We investigate under which dynamical conditions the Julia set of a quadratic rational map is a Sierp...
<p>Classical Sierpinski triangle (left) and Sierpinski-like arrangement of alveolar areas with vario...
This paper is about the beauty of fractals and the surprising con-nections between them. We will exp...
ABSTRACT. Given two points p and q of the Sierpinski universal plane curve S, necessary and / or suf...
This work is inserted in the context of technical high school andit aimed to analyze the integration...
We obtain several characterisations of the Kiepert, Jarabek, and Feuerbach hyperbolas of a scalene t...
Self-similar fractal structures are of fundamental importance in science, mathematics, and aesthetic...
AbstractWe present a topological characterization of the Sierpiński triangle. This answers question ...
In this paper, we give a few results on the local behavior of harmonic functions on the Sierpinski t...
The Sierpinski triangle also known as Sierpinski gasket is one of the most interesting and the simpl...
The classical Sierpinski Gasket defined on the equilateral triangle is a typical example of fractals...
Abstract. In this paper, we consider a large variety of solutions for the generation of Sierpinski t...
We generalize the construction of the ordinary Sierpinski triangle to obtain a two-parameter family ...
This paper focuses on the original articles written by Waclaw Sierpinski in 1915, when he introduced...
This article is a continuation of a previous work which dealt with the inversion of a Sierpinski tri...
We investigate under which dynamical conditions the Julia set of a quadratic rational map is a Sierp...
<p>Classical Sierpinski triangle (left) and Sierpinski-like arrangement of alveolar areas with vario...
This paper is about the beauty of fractals and the surprising con-nections between them. We will exp...
ABSTRACT. Given two points p and q of the Sierpinski universal plane curve S, necessary and / or suf...
This work is inserted in the context of technical high school andit aimed to analyze the integration...
We obtain several characterisations of the Kiepert, Jarabek, and Feuerbach hyperbolas of a scalene t...
Self-similar fractal structures are of fundamental importance in science, mathematics, and aesthetic...
AbstractWe present a topological characterization of the Sierpiński triangle. This answers question ...
In this paper, we give a few results on the local behavior of harmonic functions on the Sierpinski t...