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Nature’s Patterns and the Fractional Calculus

Bruce J. West (Autor)

Buch | Hardcover

XIV, 199 Seiten

2017
De Gruyter (Verlag)
978-3-11-053411-5 (ISBN)

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Complexity increases with increasing system size in everything from organisms to organizations. The nonlinear dependence of a system’s functionality on its size, by means of an allometry relation, is argued to be a consequence of their joint dependency on complexity (information). In turn, complexity is proven to be the source of allometry and to provide a new kind of force entailed by a system‘s information gradient. Based on first principles, the scaling behavior of the probability density function is determined by the exact solution to a set of fractional differential equations. The resulting lowest order moments in system size and functionality gives rise to the empirical allometry relations. Taking examples from various topics in nature, the book is of interest to researchers in applied mathematics, as well as, investigators in the natural, social, physical and life sciences. ContentsComplexityEmpirical allometryStatistics, scaling and simulationAllometry theoriesStrange kineticsFractional probability calculus

Bruce J. West, US Army Research Office, Cary, US

Table of Content:

Chapter 1: Complexity Science

1.1 It started with physics

1.2 Complexity

1.3 Measures of size

1.4 Allometry heuristics

1.5 Overview

Chapter 2: Empirical Allometry

2.1 Living networks

2.2 Physical networks

2.3 Natural history

2.4 Sociology

2.5 Summary

Chapter 3 Statistics, Scaling and Simulation

3.1 Interpreting fluctuations

3.2 Phenomenological distributions

3.3 Are ARs universal?

3.4 Summary

Chapter 4: Models & Derivations of ARs

4.1 Optimization principles

4.2 Scaling and allometry

4.3 Stochastic differential equations

4.4 Fokker-Planck equations

4.5 Summary

Chapter 5: Complex and Strange Kinetics

5.1 Fractional thinking

5.2 Fractional rate equations

5.3 Fractional Poisson process

5.4 A closer look at complexity

5.5 Recapitulation

5.6 Appendix

Chapter 6: Fractional Probability Calculus

6.1 Fractional Fokker-Planck equation

6.2 Fully fractional phase space equations

6.3 Entropy entails allometry

6.4 Statistics of allometry parameters

6.5 Discussion and conclusions

6.6 Epilogue

Erscheinungsdatum	15.09.2017
Reihe/Serie	Fractional Calculus in Applied Sciences and Engineering ; 2
Zusatzinfo	48 b/w and 8 col. ill.
Verlagsort	Berlin/Boston
Sprache	englisch
Maße	170 x 240 mm
Gewicht	505 g
Themenwelt	Mathematik / Informatik ► Mathematik ► Analysis
Themenwelt	Technik
Schlagworte	Anatomy & Physiology (see also Life Sciences • Applied • Applied mathematics • Complex Analysis • Developmental Biology • ENTSTEHUNGWERKE • Goethe • Human Anatomy & Physiology • Human Anatomy & Physiology) • Infinitesimalrechnung • Life Sciences • Mathematical & Computational • Mathematics • Mathematik • Nonlinear and Complex Systems • Physics • Science • System Theory • Technik
ISBN-10	3-11-053411-8 / 3110534118
ISBN-13	978-3-11-053411-5 / 9783110534115
Zustand	Neuware