Add to ORKGThe hypercomplex fractals obtained from generalizations of J- and M-sets, apart from their visual aesthetics, play an important role in the mathematical description in various fields of physics. The generalizations of J- and M-sets to the four-dimensional Euclidean space are well known and well described. However, very few studies were done for the higher-dimensional generalizations. The paper discusses the J-sets generalization to the hypercomplex algebra of bioctonions and completes the previous studies in this domain. The symmetry properties were studied for quadratic mapping of the bioctonionic J-sets. The discussion of limitations of the further generalizations of J-sets to higher hypercomplex spaces was also provided
The problem on intersection of Cantor sets was examined in many papers. To solve this problem, we in...
Hypercomplex analysis is the extension of complex analysis to higher dimensions where the concept of...
We conjecture that the fractal dimension of hyperbolic sets can be computed by adding those of their...
Higher-dimensional hypercomplex fractal sets are getting more and more attention because of the disc...
A complex map can give rise to two kinds of fractal sets: the Julia sets and the parameters sets (or...
In this paper, the analysis of generalized multicomplex Mandelbrot-Julia (henceforth abbrev. M-J) se...
Addressed to all readers with an interest in fractals, hyperspaces, fixed-point theory, tilings and ...
This work reports on a study of the Mandelbrot set and Julia set for a generalization of the well-ex...
Fractal is a set, which geometric pattern is self-similar at different scales. It has a fractal dime...
Hypermatrices are defined. Elementary operations and properties are defined and discussed. A 4-ary M...
This book is mainly devoted to the combinatorics of quadratic holomorphic dynamics. The conceptual k...
This book is a collection of 12 innovative research papers in the field of hypercompositional algebr...
Self-similar sets with the open set condition, the linear objects of fractal geometry, have been con...
The fractals generated from the self-squared function, 2z z c where z and c are complex quantiti...
The concept of universal Julia set introduced in [5] allows us to conclude that the dynamics of a ro...
The problem on intersection of Cantor sets was examined in many papers. To solve this problem, we in...
Hypercomplex analysis is the extension of complex analysis to higher dimensions where the concept of...
We conjecture that the fractal dimension of hyperbolic sets can be computed by adding those of their...
Higher-dimensional hypercomplex fractal sets are getting more and more attention because of the disc...
A complex map can give rise to two kinds of fractal sets: the Julia sets and the parameters sets (or...
In this paper, the analysis of generalized multicomplex Mandelbrot-Julia (henceforth abbrev. M-J) se...
Addressed to all readers with an interest in fractals, hyperspaces, fixed-point theory, tilings and ...
This work reports on a study of the Mandelbrot set and Julia set for a generalization of the well-ex...
Fractal is a set, which geometric pattern is self-similar at different scales. It has a fractal dime...
Hypermatrices are defined. Elementary operations and properties are defined and discussed. A 4-ary M...
This book is mainly devoted to the combinatorics of quadratic holomorphic dynamics. The conceptual k...
This book is a collection of 12 innovative research papers in the field of hypercompositional algebr...
Self-similar sets with the open set condition, the linear objects of fractal geometry, have been con...
The fractals generated from the self-squared function, 2z z c where z and c are complex quantiti...
The concept of universal Julia set introduced in [5] allows us to conclude that the dynamics of a ro...
The problem on intersection of Cantor sets was examined in many papers. To solve this problem, we in...
Hypercomplex analysis is the extension of complex analysis to higher dimensions where the concept of...
We conjecture that the fractal dimension of hyperbolic sets can be computed by adding those of their...