Add to ORKGAbstract. Traditional mathematical tools used for analysis of fractals allow one to distinguish results of self-similarity processes after a finite number of iterations. For example, the result of procedure of construction of Cantor’s set after two steps is different from that obtained after three steps. However, we are not able to make such a distinction at infinity. It is shown in this paper that infinite and infinitesimal numbers proposed recently allow one to measure results of fractal processes at different iterations at infinity too. First, the new technique is used to measure at infinity sets being results of Cantor’s proce-dure. Second, it is applied to calculate the lengths of polygonal geometric spirals at different points of infi...
Many biological processes and objects can be described by fractals. The paper uses a new type of obj...
Many biological processes and objects can be described by fractals. The paper uses a new type of obj...
Fractal dimension is useful to characterize the structure of spatial objects such as urban structure...
The paper considers a new type of objects – blinking fractals – that are not covered by traditional ...
Very often traditional approaches studying dynamics of self-similarity processes are not a...
Very often traditional approaches studying dynamics of self-similarity processes are not able to giv...
This ASI- which was also the 28th session of the Seminaire de mathematiques superieures of the Unive...
In many natural and engineered systems, the circle and the spiral are the appropriate primitives. A...
Fractals are everywhere. Fractals relate to many different branches of science and mathematics. They...
Fractal geometry is usually studied in the context of bounded sets. In this setting,\ud various prop...
Classical geometry has, for a long time, been used to shape our understanding of the natural world. ...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
In the first chapter we define and look at examples of self-similar sets and some of\ud their proper...
Fractal is a set, which geometric pattern is self-similar at different scales. It has a fractal dime...
Fractal analysis is an important tool when we need to study geometrical objects less regular than or...
Many biological processes and objects can be described by fractals. The paper uses a new type of obj...
Many biological processes and objects can be described by fractals. The paper uses a new type of obj...
Fractal dimension is useful to characterize the structure of spatial objects such as urban structure...
The paper considers a new type of objects – blinking fractals – that are not covered by traditional ...
Very often traditional approaches studying dynamics of self-similarity processes are not a...
Very often traditional approaches studying dynamics of self-similarity processes are not able to giv...
This ASI- which was also the 28th session of the Seminaire de mathematiques superieures of the Unive...
In many natural and engineered systems, the circle and the spiral are the appropriate primitives. A...
Fractals are everywhere. Fractals relate to many different branches of science and mathematics. They...
Fractal geometry is usually studied in the context of bounded sets. In this setting,\ud various prop...
Classical geometry has, for a long time, been used to shape our understanding of the natural world. ...
Fractal geometry is a branch of mathematics that deals with, on a basic level, repeating geometric p...
In the first chapter we define and look at examples of self-similar sets and some of\ud their proper...
Fractal is a set, which geometric pattern is self-similar at different scales. It has a fractal dime...
Fractal analysis is an important tool when we need to study geometrical objects less regular than or...
Many biological processes and objects can be described by fractals. The paper uses a new type of obj...
Many biological processes and objects can be described by fractals. The paper uses a new type of obj...
Fractal dimension is useful to characterize the structure of spatial objects such as urban structure...