Publication detail

Statistics of fractal systems

ZMEŠKAL, O. NEŠPŮREK, S. VESELÝ, M. DZIK, P.

Original Title

Statistics of fractal systems

Type

journal article - other

Language

English

Original Abstract

Distribution functions are used for the description of energy distribution of elementary particles, atoms, and molecules in dynamic systems. These distribution functions depend on the energy of the system and on its properties. The paper focuses on the generalization of the relationships commonly used to study the statistical properties of particles in 3D space so that they become generally applicable onto an E-dimensional space. These relationships can then be applied e.g. for studying the properties of the particles in 2D and in 1D space. Two approaches are discussed to describe the classic (Maxwell Boltzmann) and quantum (Fermi-Dirac, Einstein-Bose) distribution functions. The first approach is based on standard theory of probability, the second one on the fractal theory. We have shown that both approaches lead to the same results for defined boundary conditions. But the validity of the second one, i.e. the fractal approach, is much more general.

Keywords

fractal physics, classic and quantum statistics, classical theory of statistics, fractal theory of statistics

Authors

ZMEŠKAL, O.; NEŠPŮREK, S.; VESELÝ, M.; DZIK, P.

RIV year

2014

Released

23. 6. 2014

Publisher

Springer

Location

Heidelberg

ISBN

2194-5357

Periodical

Advances in Intelligent Systems and Computing

Year of study

289

Number

1

State

Swiss Confederation

Pages from

55

Pages to

63

Pages count

9

BibTex

@article{BUT109916,
  author="Oldřich {Zmeškal} and Stanislav {Nešpůrek} and Michal {Veselý} and Petr {Dzik}",
  title="Statistics of fractal systems",
  journal="Advances in Intelligent Systems and Computing",
  year="2014",
  volume="289",
  number="1",
  pages="55--63",
  issn="2194-5357"
}