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On the fractional calculus in abstract spaces and their applications to the Dirichlet-type problem of fractional order

✍ Scribed by Hussein A.H. Salem

Publisher
Elsevier Science
Year
2010
Tongue
English
Weight
923 KB
Volume
59
Category
Article
ISSN
0898-1221

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✦ Synopsis

In the following pages, based on the linear functional over a Banach space E and on the definition of fractional integrals of real-valued functions, we define the fractional Pettisintegrals of E-valued functions and the corresponding fractional derivatives. Also, we show that the well-known properties of fractional calculus over the domains of the Lebesgue integrable also hold in the Pettis space. To encompass the full scope of the paper, we apply this abstract result to investigate the existence of Pseudo-solutions to the following fractional-order boundary value problem

in the Banach space C [I, E] under Pettis integrability assumptions imposed on f . Our results extend all previous results of the same type in the Bochner integrability setting and in the Pettis integrability one. Here, λ ∈ R, u ∈ L p , a ∈ L q and l ∈ E.

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