Hardy-type inequalities in fractional \(h\)-discrete calculus
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Publication:824507
DOI10.1186/s13660-018-1662-6zbMath1497.39003OpenAlexW2795562394WikidataQ52599806 ScholiaQ52599806MaRDI QIDQ824507
Lars-Erik Persson, Serikbol Shaimardan, Ryskul Oinarov
Publication date: 15 December 2021
Published in: Journal of Inequalities and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1186/s13660-018-1662-6
Fractional derivatives and integrals (26A33) Inequalities for sums, series and integrals (26D15) Discrete version of topics in analysis (39A12) Difference equations, scaling ((q)-differences) (39A13)
Related Items (3)
Chebyshev type inequalities with fractional delta and nabla h-sum operators ⋮ Fractional order Hardy-type inequality in fractional h-discrete calculus ⋮ WEIGHTED HARDY INEQUALITIES WITH SHARP CONSTANTS
Cites Work
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- Leitmann's direct method for fractional optimization problems
- Existence results for nonlinear fractional difference equation
- Necessary optimality conditions for fractional difference problems of the calculus of variations
- Fractional calculus for scientists and engineers.
- Comments on ``Discretization of fractional order differentiator over Paley-Wiener space
- Necessary and sufficient conditions for the fractional calculus of variations with Caputo derivatives
- Basic theory of fractional differential equations
- Generalized natural boundary conditions for fractional variational problems in terms of the Caputo derivative
- On the fractional order \(m\)-point boundary value problem in reflexive Banach spaces and weak topologies
- Fractional differential equations. An introduction to fractional derivatives, fractional differential equations, to methods of their solution and some of their applications
- Fractional sums and differences with binomial coefficients
- On \(l^p\) norms of weighted mean matrices
- Hardy-type inequalities via auxiliary sequences
- Theh-Difference Approach to Controllability and Observability of Fractional Linear Systems with Caputo-Type Operator
- Fractional h-difference equations arising from the calculus of variations
- On Hardy q-inequalities
- Dynamic Inequalities On Time Scales
- Initial value problems in discrete fractional calculus
- A note on Hardy-type inequalities
- Factorizing the classical inequalities
- Overview of Fractional h-difference Operators
- Weighted Inequalities of Hardy Type
- Controllability ofh-difference linear control systems with two fractional orders
- Advances in Fractional Calculus
- Convex functions and their applications. A contemporary approach
- Quantum calculus
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