In recent years, intrinsic metrics have been described on various fractals with different formulas. The Sierpinski gasket is given as one of the fundamental models which defined the intrinsic metrics on them via the code representations of the points. In this paper, we obtain the explicit formulas of the intrinsic metrics on some self-similar sets (but not strictly self-similar), which are composed of different combinations of equilateral and right Sierpinski gaskets, respectively, by using the code representations of their points. We then express geometrical properties of these structures on their code sets and also give some illustrative examples
The Sierpinski gasket and other self-similar fractal subsets of Rd, d = 2, can be mapped by quasicon...
We use the idea of a scalarization of a cone metric to prove that the topology generated by any cone...
Fractal sets are irregular sets, exhibiting interesting properties. Some well-known fractal sets are...
The classical Sierpinski Gasket defined on the equilateral triangle is a typical example of fractals...
Fractal sets are sets that show self-similarity meaning that if one zooms in on some part of the fra...
Title: Hausdorff metric and its application in fractals Author: Branislav Ján Roháľ Department: Depa...
The work is the second part of a previous one, published in the same magazine (Contextos I...
The purpose of this paper is to construct sets, measures and energy forms of certain mixed nested fr...
Addressed to all readers with an interest in fractals, hyperspaces, fixed-point theory, tilings and ...
Each homeomorphism from the n-dimensional Sierpiński gasket into itself is a similarity map with res...
Abstract: The scale symmetry of self-similarity is a fundamental one in physics and in geometry. We ...
A fractal is a mathematical set that typically displays self-similar patterns, which means it is "th...
This paper deals with the topological-metric structure of a network made by a family of self-simila...
This book offers an organized and systematic approach to poset metrics and codes. Poset metrics, or ...
The most known fractals are invariant sets with respect to a system of contraction maps, especially ...
The Sierpinski gasket and other self-similar fractal subsets of Rd, d = 2, can be mapped by quasicon...
We use the idea of a scalarization of a cone metric to prove that the topology generated by any cone...
Fractal sets are irregular sets, exhibiting interesting properties. Some well-known fractal sets are...
The classical Sierpinski Gasket defined on the equilateral triangle is a typical example of fractals...
Fractal sets are sets that show self-similarity meaning that if one zooms in on some part of the fra...
Title: Hausdorff metric and its application in fractals Author: Branislav Ján Roháľ Department: Depa...
The work is the second part of a previous one, published in the same magazine (Contextos I...
The purpose of this paper is to construct sets, measures and energy forms of certain mixed nested fr...
Addressed to all readers with an interest in fractals, hyperspaces, fixed-point theory, tilings and ...
Each homeomorphism from the n-dimensional Sierpiński gasket into itself is a similarity map with res...
Abstract: The scale symmetry of self-similarity is a fundamental one in physics and in geometry. We ...
A fractal is a mathematical set that typically displays self-similar patterns, which means it is "th...
This paper deals with the topological-metric structure of a network made by a family of self-simila...
This book offers an organized and systematic approach to poset metrics and codes. Poset metrics, or ...
The most known fractals are invariant sets with respect to a system of contraction maps, especially ...
The Sierpinski gasket and other self-similar fractal subsets of Rd, d = 2, can be mapped by quasicon...
We use the idea of a scalarization of a cone metric to prove that the topology generated by any cone...
Fractal sets are irregular sets, exhibiting interesting properties. Some well-known fractal sets are...