Inhaltsverzeichnis
Introduction: Mittag-Leffler and Other Related Functions. - Generalized Differential and Integral Operators. - Cauchy Type Problems. - Fractional Diffusion and Fokker-Planck Equations. - Fractional Wave Equations. - Generalized Langevin Equation. - Fractional Generalized Langevin Equation. - Appendix A: Completely monotone, Bernstein and Stieltjes Functions. - Appendix B: Tauberian Theorems.
In this valuable and interesting book, the authors treat the vast theory of fractional calculus. The book is very well-organized and carefully written. The authors listed a plentiful of references in each section, which help the reader for further study. Detailed computations and many graphical representations enhance the understanding of the reader. Researchers and students from diverse scientific communities working in fractional calculus will find this book a source of various ideas and tools. (Seunghyeok Kim, zbMATH 1473. 35002, 2021)
The book is written in a very concise and precise mathematical manner. The results concerning different types of fractional equations gathered in the book may be a valuable resource to researchers interested in the modeling of various processes related to anomalous diffusion behavior. (Krzysztof Rogowski, Mathematical Reviews, August, 2021)
This book is a very specialized text that considers fractional calculus and fractional differential equations used in the study of fractional stochastic and kinetic models. The current book is essentially a monograph that explores applications using several variations of the fractional calculus. (MAA Reviews, March 1, 2020)
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