Results 11 to 20 of about 582 (128)
Certain Novel p,q-Fractional Integral Inequalities of Grüss and Chebyshev-Type on Finite Intervals
Journal of MathematicsIn this article, we investigate certain novel Grüss and Chebyshev-type integral inequalities via fractional p,q-calculus on finite intervals. Then, some new Pólya–Szegö–type p,q-fractional integral inequalities are also presented.
Xiaohong Zuo, Wengui Yang
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Some k-fractional extension of Grüss-type inequalities via generalized Hilfer–Katugampola derivative
Advances in Difference Equations, 2021 In this paper, we prove several inequalities of the Grüss type involving generalized k-fractional Hilfer–Katugampola derivative. In 1935, Grüss demonstrated a fascinating integral inequality, which gives approximation for the product of two functions ...
Samaira Naz +2 more
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The local health impacts of natural resource booms
Health Economics, Volume 32, Issue 2, Page 462-500, February 2023., 2023 Abstract This paper uses novel micro‐data on natural resources and administrative health data in Brazil to study how economic booms in minerals affect health at birth. By implementing a reduced‐form estimation of shift‐share research designs, the identification strategy relies on the exogeneity of global commodity prices to municipality‐specific health
Elisa M. Maffioli
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On Inequalities for q‐h‐Integrals via Convex Functions
Journal of Mathematics, Volume 2023, Issue 1, 2023., 2023 This article aims to investigate unified versions of the well‐known Hermite–Hadamard inequality by considering q‐h‐integrals and properties of convex functions. Currently published results for q‐integrals can be deduced from inequalities of this paper. Moreover, some new results are presented in terms of corollaries.
Yonghong Liu +6 more
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Journal of Function Spaces, Volume 2023, Issue 1, 2023., 2023 In this study, the modification of the concept of exponentially convex function, which is a general version of convex functions, given on the coordinates, is recalled. With the help of an integral identity which includes the Riemann‐Liouville (RL) fractional integral operator, new Hadamard‐type inequalities are proved for exponentially convex functions
Ahmet Ocak Akdemir +4 more
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New Fractional Inequalities through Convex Functions and Comprehensive Riemann–Liouville Integrals
Journal of Mathematics, Volume 2023, Issue 1, 2023., 2023 In most fields of applied sciences, inequalities are important in constructing mathematical systems and associated solution functions. Convexity also has a significant impact on an assortment of mathematical topics. By utilizing a comprehensive version of Riemann–Liouville integrals and the functions’ convexity condition, we present and prove novel ...
Abd-Allah Hyder, Çetin Yildiz
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Some Grüss-type inequalities using generalized Katugampola fractional integral
AIMS Mathematics, 2020 The main objective of this paper is to obtain a generalization of some Grüss-type inequalities in case of functional bounds by using a generalized Katugampola fractional integral.
Tariq A. Aljaaidi, Deepak B. Pachpatte
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Journal of Function Spaces, Volume 2022, Issue 1, 2022., 2022 Convexity plays a vital role in pure and applied mathematics specially in optimization theory, but the classical convexity is not enough to fulfil the needs of modern mathematics; hence, it is important to study generalized notion of convexity. Fraction integral operators also become an important tool for solving problems of model physical and ...
Hengxiao Qi +4 more
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On Ostrowski Type Inequalities for Generalized Integral Operators
Journal of Mathematics, Volume 2022, Issue 1, 2022., 2022 It is well known that mathematical inequalities have played a very important role in solving both theoretical and practical problems. In this paper, we show some new results related to Ostrowski type inequalities for generalized integral operators.
Martha Paola Cruz +5 more
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Journal of Function Spaces, Volume 2022, Issue 1, 2022., 2022 In this manuscript, we are getting some novel inequalities for convex functions by a new generalized fractional integral operator setting. Our results are established by merging the (k, s)‐Riemann‐Liouville fractional integral operator with the generalized Katugampola fractional integral operator.
Majid K. Neamah +5 more
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