Fractional Calculus and Hypergeometric Functions in Complex Analysis
Materialtyp:
ArtikelUtgivningsinformation: MDPI - Multidisciplinary Digital Publishing Institute 2024Beskrivning: 1 electronic resource (238 p.)Innehållstyp: - text
- computer
- online resource
- 9783725810970
- 9783725810987
- Computing and Information Technology
- Computer science
- Bailey quadratic transformation
- Euler polynomials
- Faber polynomial expansion
- Fekete–Szegö problem
- Hankel determinant
- Hermite–Hadamard inequalities
- Janowski functions
- Kampé de Fériet's double hypergeometric function
- Liouville–Caputo's fractional derivative operator
- Riemann–Liouville fractional integral operators having exponential kernels
- S?l?gean q-differential operator
- Srivastava–Daoust double hypergeometric function
- Tau method
- Whipple transformations
- analytic function
- analytic functions
- bi-univalent function
- bi-univalent functions
- collocation method
- convex functions
- convolution
- differential subordination
- error analysis
- exponential function
- fractional calculus
- fractional differential equation
- fractional differential operator
- fractional integral of order ?
- fractional kinetic equations
- fractional-order equations
- generalized domain
- generalized hypergeometric function
- incomplete Wright hypergeometric functions
- left and right exponential trigonometric convex interval-valued mappings
- left-sided Ri
Open Access Unrestricted online access star
This reprint of the Special Issue on "Fractional Calculus and Hypergeometric Functions in Complex Analysis" has resulted in the publication of articles covering a wide range of topics. For example, the powerful and prolific tools provided by fractional calculus are combined with hypergeometric functions, which generates exciting results when integrated into studies. Quantum calculus is also involved in various investigations, alongside fractional calculus notions and methods, resulting in new, powerful operators for application in geometric function theory and other connected fields of research. Scholars studying applications of fractional calculus and hypergeometric functions in complex analysis and related fields should find this Special Issue interesting.
Creative Commons Licence cc by-nc-nd cc https://creativecommons.org/licenses/by-nc-nd/4.0/
eng
Freely available e-book