Ostrowski and Trapezoid Type Inequalities for the Generalized k-g-Fractional Integrals of Functions with Bounded Variation

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Abstract

Let g be a strictly increasing function on a , b , having a continuous derivative g′ on a , b . For the Lebesgue integrable function f : a , b → C , we define the k-g-left-sided fractional integral of f by S k , g , a + f x = ∫ a x k g x - g t g ′ t f t d t , x ∈ a , b and the k-g-right-sided fractional integral of f by S k , g , b - f x = ∫ x b k g t - g x g ′ t f t d t , x ∈ [ a , b ) , where the kernel k is defined either on 0 , ∞ or on 0 , ∞ with complex values and integrable on any finite subinterval. In this paper we establish some Ostrowski and trapezoid type inequalities for the k-g-fractional integrals of functions of bounded variation. Applications for mid-point and trapezoid inequalities are provided as well. Some examples for a general exponential fractional integral are also given.

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last seen: 2026-05-19T01:45:01.086888+00:00
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License: CC-BY-4.0