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The Fractional Trigonometry

With Applications to Fractional Differential Equations and Science

Erschienen am 30.12.2016, Auflage: 1/2016
145,00 €
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Bibliografische Daten
ISBN/EAN: 9781119139409
Sprache: Englisch
Umfang: 464 S.
Einband: gebundenes Buch

Beschreibung

Classical trigonometry plays a very important role relative to integer order calculus, and together with the common exponential function, provides solutions for linear differential equations. The authors discuss how fractional trigonometry plays an analogous role relative to the fractional calculus by providing solutions to linear fractional differential equations. The importance of the classical trigonometry goes far beyond the solutions of triangles. Its use in Fourier integrals, Fourier series, signal processing, harmonic analysis, and more provide great motivation for the development of a fractional trigonometry to expand application to the fractional calculus domain. The book begins with an introductory chapter that offers insight to the fundamentals of fractional calculus, and topical coverage is then organized in two main parts. Part One develops the definitions and theories of fractional exponentials and fractional trigonometry. Part Two provides insight into various areas of potential application within the sciences. Chapter coverage includes: Introduction; The Fractional Exponential Function via the Fundamental Fractional Differential Equation; The Generalized Exponential Function; R-Function Relationships; The Fractional Hyperboletry; The R1 Fractional Trigonometry; The R2 Fractional Trigonometry; The R3 Trigonometric Functions; The Fractional Meta-Trigonometry; The Ratio and Reciprocal Functions; Further Generalized Fractional Trigonometries; The Solution of Linear Fractional Differential Equations based on the Fractional Trigonometry; Fractional Dynamics and Fractional Systems; Numerical Issues and Approximations in the Fractional Trigonometry; The Fractional Spiral Functions; Fractional Oscillators; Shell Morphology and Growth; Mathematical Classification of the Spiral and Ring Galaxy Morphologies; and Hurricanes, Tornados, and Whirlpools. This book is the result of the authors' work in fractional calculus, and more particularly, in functions for the solutions of fractional differential equations, which is fostered in the behavior of generalized exponential functions.

Autorenportrait

Carl F. Lorenzo is Distinguished Research Associate at the NASA Glenn Research Center in Cleveland, Ohio. His past positions include chief engineer of the Instrumentation and Controls Division and chief of the Advanced Controls Technology and Systems Dynamics branches at NASA. He is internationally recognized for his work in the development and application of the fractional calculus and fractional trigonometry. Tom T. Hartley, PhD, is Emeritus Professor in the Department of Electrical and Computer Engineering at The University of Akron. Dr Hartley is a recognized expert in fractional-order systems, and together with Carl Lorenzo, has solved fundamental problems in the area including Riemann's complementary-function initialization function problem. He received his PhD in Electrical Engineering from Vanderbilt University.

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