The self-similarity properties of fractals are studied in the framework of the theory of entire analytical functions and the q-deformed algebra of coherent states. Self-similar structures are related to dissipation and to noncommutative geometry in the plane. The examples of the Koch curve and logarithmic spiral are considered in detail. It is suggested that the dynamical formation of fractals originates from the coherent boson condensation induced by the generators of the squeezed coherent states, whose (fractal) geometrical properties thus become manifest. The macroscopic nature of fractals appears to emerge from microscopic coherent local deformation processes
Based on the gravity model as a gauge theory previously by the authors, the introduction of noncommu...
Highly applied in machining, image compressing, network traffic prediction, biological dynamics, ner...
Abstract: The scale symmetry of self-similarity is a fundamental one in physics and in geometry. We ...
The self-similarity properties of fractals are studied in the framework of the theory of entire anal...
Recent results on the relation between self-similarity and squeezed coherent states are presented. I...
I show that a functional representation of self-similarity (as the one occurring in fractals) is pro...
In electrodynamics there is a mutual exchange of energy and momentum between the matter field and th...
The self-similar potentials are formulated in terms of the shape-invariance. Based on it, a coherent...
Shows a description of the fractal structure to the non-crystalline state using the system non-linea...
A new mathematical concept of abstract similarity is introduced and is illustrated in the space of i...
The Hall-resistance curve of a two-dimensional electron system in the presence of a strong perpendic...
Fractal is a set, which geometric pattern is self-similar at different scales. It has a fractal dime...
One of the most basic ingredients of fractal or multifractal is its scale-invariance or self-similar...
Found that the formation of fractal dissipative structures in non-crystalline solids associated with...
Many systems in nature have arborescent and bifurcated structures such as trees, fern, snails, lungs...
Based on the gravity model as a gauge theory previously by the authors, the introduction of noncommu...
Highly applied in machining, image compressing, network traffic prediction, biological dynamics, ner...
Abstract: The scale symmetry of self-similarity is a fundamental one in physics and in geometry. We ...
The self-similarity properties of fractals are studied in the framework of the theory of entire anal...
Recent results on the relation between self-similarity and squeezed coherent states are presented. I...
I show that a functional representation of self-similarity (as the one occurring in fractals) is pro...
In electrodynamics there is a mutual exchange of energy and momentum between the matter field and th...
The self-similar potentials are formulated in terms of the shape-invariance. Based on it, a coherent...
Shows a description of the fractal structure to the non-crystalline state using the system non-linea...
A new mathematical concept of abstract similarity is introduced and is illustrated in the space of i...
The Hall-resistance curve of a two-dimensional electron system in the presence of a strong perpendic...
Fractal is a set, which geometric pattern is self-similar at different scales. It has a fractal dime...
One of the most basic ingredients of fractal or multifractal is its scale-invariance or self-similar...
Found that the formation of fractal dissipative structures in non-crystalline solids associated with...
Many systems in nature have arborescent and bifurcated structures such as trees, fern, snails, lungs...
Based on the gravity model as a gauge theory previously by the authors, the introduction of noncommu...
Highly applied in machining, image compressing, network traffic prediction, biological dynamics, ner...
Abstract: The scale symmetry of self-similarity is a fundamental one in physics and in geometry. We ...