Results 21 to 30 of about 5,236 (261)
On weighted fractional inequalities using generalized Katugampola fractional integral operator [PDF]
Fractional Differential Calculus, 2020 Summary: In this paper, we obtain some new weighted fractional inequalities which are presented by \textit{M. Houas} in the paper [Sci., Ser. A, Math. Sci. (N.S.) 27, 87--97 (2016; Zbl 1429.26028)], using generalized Katugampola fractional integral operator.
Panchal, Satish K. +2 more
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Advances in Difference Equations, 2020 The present work investigates the applicability and effectiveness of generalized proportional fractional integral ( GPFI $\mathcal{GPFI}$ ) operator in another sense.
Thabet Abdeljawad +4 more
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Weighted boundedness of discrete fractional integrals [PDF]
SCIENTIA SINICA Mathematica, 2020 In this paper, via introducing the reverse Holder class on $\\mathbb{Z}$,$RH_r(\\mathbb{Z})$ ($r\\in(1,\\infty)$), and establishingits relation with the space of Muckenhoupt weights on $\\mathbb{Z}$,$A_q(\\mathbb{Z})$ ($q\\in[1,\\infty)$), and with the help of the relationbetween the boundedness of pseudo-difference operators(including the discrete ...
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Certain Results Comprising the Weighted Chebyshev Function Using Pathway Fractional Integrals
Mathematics, 2019 An analogous version of Chebyshev inequality, associated with the weighted function, has been established using the pathway fractional integral operators. The result is a generalization of the Chebyshev inequality in fractional integral operators.
Aditya Mani Mishra +3 more
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Fractional Integral Inequalities via Hadamard’s Fractional Integral
Abstract and Applied Analysis, 2014 We establish new fractional integral inequalities, via Hadamard’s fractional integral. Several new integral inequalities are obtained, including a Grüss type Hadamard fractional integral inequality, by using Young and weighted AM-GM inequalities.
Weerawat Sudsutad +2 more
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A Comprehensive Review on the Fejér-Type Inequality Pertaining to Fractional Integral Operators
Axioms, 2023 A review of the results on the fractional Fejér-type inequalities, associated with different families of convexities and different kinds of fractional integrals, is presented.
Muhammad Tariq +2 more
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Weighted fractional and integral k-matching in hypergraphs
Discrete Applied Mathematics, 1995 It is well-known that the problem of maximum \(K\)-matching in a weighted hypergraph is strongly NP-hard, i.e. it is most unlikely that a fully polynomial approximation algorithm for solving it exists. The main result of the paper is the following: Let the edge weights be rational numbers in \([0, i]\).
Srivastav, Anand, Stangier, Peter
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Fractional integrals on weighted Hardy spaces
Journal of Mathematical Analysis and Applications, 2003 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Ding, Yong +2 more
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Fractional integrals on weighted 𝐻^{𝑝} spaces [PDF]
Transactions of the American Mathematical Society, 1985 We characterize the pairs of doubling weights ( u , v ) (u,v) on R n {R^n} such that \[ ∥ I α f ∥ H
Angel E. Gatto +2 more
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Entropy bump conditions for fractional maximal and integral operators
Concrete Operators, 2016 We investigate weighted inequalities for fractional maximal operators and fractional integral operators.We work within the innovative framework of “entropy bounds” introduced by Treil–Volberg. Using techniques developed by Lacey and the second author, we
Rahm Robert, Spencer Scott
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