Add to ORKGThe Koch snowflake is one of the first fractals that were mathematically described. It is interesting because it has an infinite perimeter in the limit but its limit area is finite. In this paper, a recently proposed computational methodology allowing one to execute numerical computations with infinities and infinitesimals is applied to study the Koch snowflake at infinity. Numerical computations with actual infinite and infinitesimal numbers can be executed on the Infinity Computer being a new supercomputer patented in USA and EU. It is revealed in the paper that at infinity the snowflake is not unique, i.e., different snowflakes can be distinguished for differ...
The purpose of this paper consists in a better understanding of the fractional nature of the nonloca...
"How long is the coast of Britain?" was the question stated by Mandelbrot. Using smaller and smaller...
In this survey, a recent computational methodology paying a special attention to the separation ...
This paper will involve an investigation into Fractals, particularly the Koch Snowflake. The history...
The educational object is an animation which allows visualizing the process of construction of Koch’...
In this dissertation, we will focus our attention on the limiting behavior of a sequence of compatib...
The paper considers a new type of objects – blinking fractals – that are not covered by traditional ...
Abstract. In this paper, we attempt to define and understand the orbits of the Koch snowflake fracta...
Very often traditional approaches studying dynamics of self-similarity processes are not a...
Abstract. Traditional mathematical tools used for analysis of fractals allow one to distinguish resu...
A Mapping from C onto C is quasiconformal, if it maps "infinitesimally small circles" onto "infinite...
Abstract. In this paper, we attempt to define and understand the orbits of the Koch snowflake fracta...
Fractal objects have some unique geometrical properties. One of them is the possibility to enclose i...
This paper introduces an analyse of the fractal dimension by Richardson’s method. Two different way...
The small-angle scattering (SAS) from the Cantor surface fractal on the plane and Koch snowflake is ...
The purpose of this paper consists in a better understanding of the fractional nature of the nonloca...
"How long is the coast of Britain?" was the question stated by Mandelbrot. Using smaller and smaller...
In this survey, a recent computational methodology paying a special attention to the separation ...
This paper will involve an investigation into Fractals, particularly the Koch Snowflake. The history...
The educational object is an animation which allows visualizing the process of construction of Koch’...
In this dissertation, we will focus our attention on the limiting behavior of a sequence of compatib...
The paper considers a new type of objects – blinking fractals – that are not covered by traditional ...
Abstract. In this paper, we attempt to define and understand the orbits of the Koch snowflake fracta...
Very often traditional approaches studying dynamics of self-similarity processes are not a...
Abstract. Traditional mathematical tools used for analysis of fractals allow one to distinguish resu...
A Mapping from C onto C is quasiconformal, if it maps "infinitesimally small circles" onto "infinite...
Abstract. In this paper, we attempt to define and understand the orbits of the Koch snowflake fracta...
Fractal objects have some unique geometrical properties. One of them is the possibility to enclose i...
This paper introduces an analyse of the fractal dimension by Richardson’s method. Two different way...
The small-angle scattering (SAS) from the Cantor surface fractal on the plane and Koch snowflake is ...
The purpose of this paper consists in a better understanding of the fractional nature of the nonloca...
"How long is the coast of Britain?" was the question stated by Mandelbrot. Using smaller and smaller...
In this survey, a recent computational methodology paying a special attention to the separation ...