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Fractional Calculus and Special Functions with Applications



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Autore: Özarslan Mehmet Ali Visualizza persona
Titolo: Fractional Calculus and Special Functions with Applications Visualizza cluster
Pubblicazione: Basel, : MDPI - Multidisciplinary Digital Publishing Institute, 2022
Descrizione fisica: 1 electronic resource (164 p.)
Soggetto topico: Research & information: general
Mathematics & science
Soggetto non controllato: Caputo-Hadamard fractional derivative
coupled system
Hadamard fractional integral
boundary conditions
existence
fixed point theorem
fractional Langevin equations
existence and uniqueness solution
fractional derivatives and integrals
stochastic processes
calculus of variations
Mittag-Leffler functions
Prabhakar fractional calculus
Atangana-Baleanu fractional calculus
complex integrals
analytic continuation
k-gamma function
k-beta function
Pochhammer symbol
hypergeometric function
Appell functions
integral representation
reduction and transformation formula
fractional derivative
generating function
physical problems
fractional derivatives
fractional modeling
real-world problems
electrical circuits
fractional differential equations
fixed point theory
Atangana-Baleanu derivative
mobile phone worms
fractional integrals
Abel equations
Laplace transforms
mixed partial derivatives
second Chebyshev wavelet
system of Volterra-Fredholm integro-differential equations
fractional-order Caputo derivative operator
fractional-order Riemann-Liouville integral operator
error bound
Persona (resp. second.): FernandezArran
AreaIvan
ÖzarslanMehmet Ali
Sommario/riassunto: The study of fractional integrals and fractional derivatives has a long history, and they have many real-world applications because of their properties of interpolation between integer-order operators. This field includes classical fractional operators such as Riemann–Liouville, Weyl, Caputo, and Grunwald–Letnikov; nevertheless, especially in the last two decades, many new operators have also appeared that often define using integrals with special functions in the kernel, such as Atangana–Baleanu, Prabhakar, Marichev–Saigo–Maeda, and the tempered fractional equation, as well as their extended or multivariable forms. These have been intensively studied because they can also be useful in modelling and analysing real-world processes, due to their different properties and behaviours from those of the classical cases.Special functions, such as Mittag–Leffler functions, hypergeometric functions, Fox's H-functions, Wright functions, and Bessel and hyper-Bessel functions, also have important connections with fractional calculus. Some of them, such as the Mittag–Leffler function and its generalisations, appear naturally as solutions of fractional differential equations. Furthermore, many interesting relationships between different special functions are found by using the operators of fractional calculus. Certain special functions have also been applied to analyse the qualitative properties of fractional differential equations, e.g., the concept of Mittag–Leffler stability.The aim of this reprint is to explore and highlight the diverse connections between fractional calculus and special functions, and their associated applications.
Titolo autorizzato: Fractional Calculus and Special Functions with Applications  Visualizza cluster
Formato: Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione: Inglese
Record Nr.: 9910566459803321
Lo trovi qui: Univ. Federico II
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