General fractional derivatives : theory, methods, and applications /
General Fractional Derivatives: Theory, Methods and Applications provides knowledge of the special functions with respect to another function, and the integro-differential operators where the integrals are of the convolution type and exist the singular, weakly singular and nonsingular kernels, which...
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| Format: | Electronic eBook |
| Language: | English |
| Published: |
Boca Raton :
CRC Press, Taylor & Francis Group,
2019.
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| Subjects: | |
| Online Access: | Taylor & Francis OCLC metadata license agreement |
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Table of Contents:
- Cover; Half Title; Title Page; Copyright Page; Dedication; Contents; Preface; Author; 1. Introduction; 1.1 History of fractional calculus; 1.1.1 The contribution for fractional calculus and applications; 1.1.2 The contribution for generalized fractional calculus and applications; 1.2 History of special functions; 1.3 Special functions with respect to another function; 2. Fractional Derivatives of Constant Order and Applications; 2.1 Fractional derivatives within power-law kernel; 2.2 Riemann-Liouville fractional calculus; 2.2.1 Riemann-Liouville fractional integrals
- 2.2.2 Riemann-Liouville fractional derivatives2.2.3 Riemann-Liouville fractional derivatives of a purely imaginary order; 2.3 Liouville-Sonine-Caputo fractional derivatives; 2.3.1 Motivations; 2.3.2 Liouville-Sonine-Caputo fractional derivatives; 2.4 Liouville-Grüunwald-Letnikov fractional derivatives; 2.4.1 Motivations; 2.4.2 Liouville-Grüunwald-Letnikov fractional derivatives; 2.4.3 Kilbas-Srivastava-Trujillo fractional derivatives; 2.5 Tarasov type fractional derivatives; 2.5.1 Tarasov type fractional derivatives; 2.5.2 Extended Tarasov type fractional derivatives
- 2.6 Riesz fractional calculus2.7 Feller fractional calculus; 2.8 Richard fractional calculus; 2.9 Erdélyi-Kober type fractional calculus; 2.9.1 Erdélyi-Kober type operators of fractional integration and fractional derivative; 2.9.2 Fractional integrals and fractional derivatives of the Erdélyi-Kober-Riesz, Erdélyi-Kober-Feller and Erdélyi-Kober-Rich; 2.10 Katugampola fractional calculus; 2.10.1 Katugampola fractional integrals and Katugampola fractional derivatives; 2.10.2 Katugampola type fractional integrals and Katugampola type fractional derivatives involving the exponential function
- 2.11 Hadamard fractional calculus2.11.1 Hadamard fractional integrals and fractional derivatives; 2.11.2 Hadamard type fractional integrals and fractional derivatives; 2.12 Marchaud fractional derivatives; 2.13 Tempered fractional calculus; 2.13.1 Motivations; 2.13.2 Tempered fractional derivatives; 2.13.3 Tempered fractional derivatives with respect to another function; 2.13.4 Tempered fractional derivatives of a purely imaginary order; 2.13.5 Tempered fractional integrals; 2.13.6 Tempered fractional integrals of a purely imaginary order
- 2.13.7 Tempered fractional derivatives in the sense of Liouville-Sonine and Liouville-Sonine-Caputo types2.13.8 Tempered fractional derivatives involving power-sine and power-cosine functions; 2.13.9 Tempered fractional calculus involving power-Kohlrausch-Williams-Watts function; 2.13.9.1 Tempered fractional derivative in the Liouville-SonineCaputo type involving the kernel of the power-Kohlrausch-Williams-Watts function; 2.13.9.2 Tempered fractional integral involving the kernel of the power-Kohlrausch-Williams-Watts function; 2.13.10 Sabzikar-Meerschaert-Chen tempered fractional calculus
General fractional derivatives : theory, methods, and applications /