论文信息 - Fractional Order Continuity and Some Properties about Integrability and Differentiability of Real Functions

Fractional Order Continuity and Some Properties about Integrability and Differentiability of Real Functions

In this paper a certain function spaceCα, 0 ≤ α ≤ 1, larger than the space of continuous functions, is introduced in order to study new properties and the extension of some already known results about the Riemann–Liouville fractional integral and derivative operators. Sufficient conditions for the continuity ofI1 − αafare given. Furthermore, necessary conditions are given for the pointwise existence of fractional derivatives. The existence of a derivative of order β, from the existence of a certain derivative of order α, β < α, is also analyzed.

Margarita Rivero | Juan J. Trujillo | B. Bonilla

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