DOIAbstract
AbstractFour and five dimensional Cantor sets are analysed in relation to two different Fibonacci series. Connections to classical and quantum mechanical statistics are outlined
AbstractFour and five dimensional Cantor sets are analysed in relation to two different Fibonacci series. Connections to classical and quantum mechanical statistics are outlined
Statistical Physics examines the collective properties of large ensembles of particles, and is a pow...
Using fractal self-similarity and functional-expectation relations, the classical theory of box inte...
Connections are drawn between the global thermodynamical interpretation of quantum mechanics and the...
AbstractFour and five dimensional Cantor sets are analysed in relation to two different Fibonacci se...
WOS: 000271434200005In this study, a physical quantity belonging to a physical system in its stages ...
WOS: 000253756700002In this study, physical quantities of a nonequilibrium system in the stages of i...
Spectral characteristics of integrated guantum systems and number theory problems, connected with th...
Abstract. The Cantor distribution is a probability distribution whose cumu-lative distribution funct...
This up-to-date account of algebraic statistics and information geometry explores the emerging conne...
This up-to-date account of algebraic statistics and information geometry explores the emerging conne...
A statistical model M is a family of probability distributions, characterised by a set of continuous...
We show that under natural technical conditions, the sum of a $C^2$ dynamically defined Cantor set w...
On the basis of the deformed series in quantum calculus, we gener-alize the partition function and t...
The present paper discusses some aspects of the role of the Cantor set in probability theory. It con...
Stochastic geometry is a relatively new branch of mathematics. Although its predecessors such as geo...
Statistical Physics examines the collective properties of large ensembles of particles, and is a pow...
Using fractal self-similarity and functional-expectation relations, the classical theory of box inte...
Connections are drawn between the global thermodynamical interpretation of quantum mechanics and the...
AbstractFour and five dimensional Cantor sets are analysed in relation to two different Fibonacci se...
WOS: 000271434200005In this study, a physical quantity belonging to a physical system in its stages ...
WOS: 000253756700002In this study, physical quantities of a nonequilibrium system in the stages of i...
Spectral characteristics of integrated guantum systems and number theory problems, connected with th...
Abstract. The Cantor distribution is a probability distribution whose cumu-lative distribution funct...
This up-to-date account of algebraic statistics and information geometry explores the emerging conne...
This up-to-date account of algebraic statistics and information geometry explores the emerging conne...
A statistical model M is a family of probability distributions, characterised by a set of continuous...
We show that under natural technical conditions, the sum of a $C^2$ dynamically defined Cantor set w...
On the basis of the deformed series in quantum calculus, we gener-alize the partition function and t...
The present paper discusses some aspects of the role of the Cantor set in probability theory. It con...
Stochastic geometry is a relatively new branch of mathematics. Although its predecessors such as geo...
Statistical Physics examines the collective properties of large ensembles of particles, and is a pow...
Using fractal self-similarity and functional-expectation relations, the classical theory of box inte...
Connections are drawn between the global thermodynamical interpretation of quantum mechanics and the...
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