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On φ–Convex Stochastic Processes and Integral Inequalities Related
ArticleAbstract: In this paper the concept of ϕ–convex stochastic process is introduced and certain algebraic propertPalabras claves:Mean square integral inequalities, Stochastic processes, ϕ–convexityAutores:Hernández J.E.H., Kashuri A., Miguel Vivas CortezFuentes:googlescopusOn a Generalized Laplace Transform
ArticleAbstract: In this work we define a generalized Laplace transform and establish some of its fundamental propertPalabras claves:Fractional Calculus, Generalized derivatives and integral, Generalized Laplace transformAutores:Juan E. N.V., Luciano M. L.M.B., Miguel Vivas CortezFuentes:googlescopusSome novel inequalities involving Atangana-Baleanu fractional integral operators and applications
ArticleAbstract: As we know, Atangana and Baleanu developed great fractional integral operators which used the generaPalabras claves:Atangana-Baleanu fractional integrals, bounded functions, higher order strongly n-polynomial convex, Hölder’s inequality, Power mean inequality, special meansAutores:Awan M.U., Javed M.Z., Kashuri A., Miguel Vivas Cortez, Rafique S.Fuentes:googlescopusNewton’s law of cooling with generalized conformable derivatives
ArticleAbstract: In this communication, using a generalized conformable differential operator, a simulation of the wePalabras claves:Conformable derivative, Fractional Calculus, Newton law of coolingAutores:Fleitas A., Guzman P.M., Miguel Vivas Cortez, Nápoles J.E., Rosales J.J.Fuentes:googlescopusOstrowski-Type Inequalities for Functions Whose Derivative Modulus is Relatively (m,h1,h2)−Convex.
ArticleAbstract: Abstract: We have found some new Ostrowski-type inequalities for functions whose derivative module iPalabras claves:Ostrowski type inequalities, Relative (m,h1,h2)−convexity, Relative convexityAutores:Carlos G., Jorge E.H., Miguel Vivas CortezFuentes:googlescopusQuantum trapezium-type inequalities using generalized ϕ-convex functions
ArticleAbstract: In this work, a study is conducted on the Hermite-Hadamard inequality using a class of generalized cPalabras claves:Generalized convexity, Hermite-hadamard inequality, Quantum estimates, Special functionsAutores:Hernández J.E.H., Kashuri A., Liko R., Miguel Vivas CortezFuentes:googlescopusA Study of Uniform Harmonic χ -Convex Functions with respect to Hermite-Hadamard's Inequality and Its Caputo-Fabrizio Fractional Analogue and Applications
ArticleAbstract: In this paper, we introduce the notion of uniform harmonic χ-convex functions. We show that this claPalabras claves:Autores:Awan M.U., Javed M.Z., Miguel Vivas Cortez, Noor K.I., Noor M.A.Fuentes:googlescopusSome new post-quantum integral inequalities involving twice (P, q)-differentiable ψ-preinvex functions and applications
ArticleAbstract: The main motivation of this article is derive a new post-quantum integral identity using twice (p, qPalabras claves:bounded functions, Hermite–Hadamard inequality, Hölder’s inequality, Post-quantum calculus, Power mean inequality, special means, ψ-preinvex functionsAutores:Awan M.U., Kashuri A., Miguel Vivas Cortez, Noor M.A., Talib S.Fuentes:googlescopusOn Opial-type inequality for a generalized fractional integral operator
ArticleAbstract: This article is aimed at establishing some results concerning integral inequalities of the Opial typPalabras claves:Fractional Calculus, Fractional integral operator, Opial inequalityAutores:Hernandez J.E.H., Martínez F., Miguel Vivas Cortez, Valdes J.E.N.Fuentes:googlescopusA Multi-Index Generalized Derivative; Some Introductory Notes
ArticleAbstract: In this work we present a generalized multi-index derivative, which contains as particular cases, wiPalabras claves:Fractional Calculus, Fractional derivatives and integral, Generalized derivativeAutores:Lugo L.M., Miguel Vivas Cortez, Samei M.E., Valdes J.E.N.Fuentes:googlescopus