It is known that quaternion number has wide application in theoretical physics and engineering fields alike, in particular to describe Maxwell electrodynamics. In the meantime, recently this quaternion number has also been used to draw fractal graph. The present note is intended as an introduction to this very interestin
Sir WIlliam Rowan Hamilton invented quaternions in the middle of the last century; he was led to thi...
We show a relation between fractional calculus and fractals, based only on physical and geometrical ...
It has become evident that fractals are not to be tied down to one compact, Webster-style, paragraph...
The theory of quaternions was introduced in the mid nineteenth century, and it found many applicatio...
AbstractWe develop quaternionic analysis using as a guiding principle representation theory of vario...
Our goal is to prove the existence of a connection between fractal geometries and fractional calculu...
We trace the logical line of formulating a theory of mechanics founded on the basic relations of mat...
A novel approach is suggested for 3D fractal visualization using commercial CAD software and special...
Owing to the rapid emergence and growth of techniques in the engineering application of fractals, it...
In Mathematics, one of the significant areas is graphs. A graph is a mathematical diagram used to sh...
In the 18th and 19th centuries the branch of mathematics that would later be known as fractal geomet...
A novel approach is suggested for 3D fractal visualization using commercial CAD software and special...
William Rowan Hamilton invented the quaternions in 1843, in his effort to construct hypercomplex num...
The aim of this book is to show some applications of fractal analysis in the fields of sciences. The...
Fractal geometry is revolutionizing the descriptive mathematics of applied materials systems. Rather...
Sir WIlliam Rowan Hamilton invented quaternions in the middle of the last century; he was led to thi...
We show a relation between fractional calculus and fractals, based only on physical and geometrical ...
It has become evident that fractals are not to be tied down to one compact, Webster-style, paragraph...
The theory of quaternions was introduced in the mid nineteenth century, and it found many applicatio...
AbstractWe develop quaternionic analysis using as a guiding principle representation theory of vario...
Our goal is to prove the existence of a connection between fractal geometries and fractional calculu...
We trace the logical line of formulating a theory of mechanics founded on the basic relations of mat...
A novel approach is suggested for 3D fractal visualization using commercial CAD software and special...
Owing to the rapid emergence and growth of techniques in the engineering application of fractals, it...
In Mathematics, one of the significant areas is graphs. A graph is a mathematical diagram used to sh...
In the 18th and 19th centuries the branch of mathematics that would later be known as fractal geomet...
A novel approach is suggested for 3D fractal visualization using commercial CAD software and special...
William Rowan Hamilton invented the quaternions in 1843, in his effort to construct hypercomplex num...
The aim of this book is to show some applications of fractal analysis in the fields of sciences. The...
Fractal geometry is revolutionizing the descriptive mathematics of applied materials systems. Rather...
Sir WIlliam Rowan Hamilton invented quaternions in the middle of the last century; he was led to thi...
We show a relation between fractional calculus and fractals, based only on physical and geometrical ...
It has become evident that fractals are not to be tied down to one compact, Webster-style, paragraph...