Fluctuations and Fractal Structure
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Fluctuations and Fractal Structure Ringberg Workshop on Multiparticle Production, Ringberg Castle, Germany, June 25-28, 1991 by Rudolph C. Hwa

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  • 22 Currently reading

Published by World Scientific Publishing Company .
Written in English


  • Particle & high-energy physics,
  • Science,
  • Intermittency (Nuclear physics,
  • High Energy Physics,
  • Particles (Nuclear physics),
  • Science/Mathematics,
  • Nuclear Physics,
  • Intermittency (Nuclear physics),
  • Congresses,
  • Hadron interactions,
  • Multiplicity

Book details:

The Physical Object
Number of Pages361
ID Numbers
Open LibraryOL9193879M
ISBN 109810208103
ISBN 109789810208103

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The Fractal Geometry of Nature Hardcover – Aug by Benoit B. Mandelbrot (Author) out of 5 stars 58 ratings. See all 2 formats and editions. Hide other formats and editions. from $ 34 Used from $ 6 New from $ 3 Collectible from $ The Amazon Book Review. Author interviews, book reviews, editors' picks, and Cited by: Thermodynamic Theory of Structure, Stability and Fluctuations by P. Glansdorff; Ilya Prigogine and a great selection of related books, art and collectibles available now at - Thermodynamic Theory of Structure, Stability and Fluctuations by Glansdorff, P - AbeBooks. Jan Petter Hansen, J. L. McCauley, Jiri Muller, A. T. Skjeltorp. Pages Phase Transition on DLA. Fractal low-density structure with a D f of ∼ is discovered in all the MGs, which can be interpreted with the percolation theory. The ξ of the fractal structure increases with the structural heterogeneity of the MGs, which is affected by the fragility and thermomechanical history of the MGs. Our result provides evidence for the existence of density fluctuations with fractal order spanning from nano-to Cited by: 4.

Fractal fluctuations and statistical analysis Fractals are the latest development in statistics. The space-time fluctuation pattern in dynamical systems was shown to have a selfsimilar or fractal structure in the s (Mandelbrot, ). The larger scale fluctuation consists of smaller scale fluctuations identical in shape to the larger scale. Fractals in the Plane the Ergodic Theory Methods. This book is an introduction to the theory of iteration of expanding and nonuniformly expanding holomorphic maps and topics in geometric measure theory of the underlying invariant fractal sets. Major topics covered: Basic examples and definitions, Measure preserving endomorphisms. The altepetl is a category that describes the organizational structure of the territory and the social hierarchy of pre-Hispanic societies in Mesoamerica. This category is used to understand the basic generator of territorial and political complexity in pre-Hispanic times. It is proposed that the repetition of itself, its iteration, increases social complexity until reaching structures Author: Fernando López Aguilar. The fractal geometry of the deposit and the power law behaviour of the quantities characterising the non-equilibrium cluster size distribution are shown to be consequences of the competition Author: Tamás Vicsek.

The Table of Contents for the book is as follows: Preface. The Brain as a Physical and Synergetic System (invited) Scaling Properties of Heartbeat Interval Fluctuations in Health and Disease. Fractality of the Blood-vessel System: The Model and its Applications. Fractal Geometry of Adrenal Cortex Mosaic Patches: Implications for Growth and. Here, we generalize the definition of bounded variations for vector-valued maps in terms of the Hausdorff measure and then use it to study what we call rapid fluctuations on fractal sets in multi. Fluctuations and Stochastic Phenomena in Condensed Matter Search within book. Front Matter. PDF. Macroscopic potentials, bifurcations and noise in dissipative systems. Diffusion in fully developed turbulence a random walk on a fractal structure. Siegfried Grossmann. Pages Until now, we have primarily described two ways of quantifying the stride-to-stride fluctuations in gait: (1) calculating the magnitude of the variability (e.g., using the SD or CV) and (2) the fractal index, a measure that captures the ordering of these by: