Documentos de Miguel Vivas-Cortez | REDI

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Área temáticas: "Álgebra"

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Applied Mathematics and Information Sciences(7)

AIMS Mathematics(6)

Área temáticas

Principios generales de matemáticas(17)

Matemáticas(6)

Probabilidades y matemática aplicada(4)

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Optimización matemática(32)

Matemáticas aplicadas(1)

Mecánica cuántica(1)

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Convex functions(4)

Fractional Calculus(4)

Generalized convexity(4)

Hermite-hadamard inequality(3)

Hölder inequality(3)

Integral inequalities of Hermite-Hadamard type for quasi-convex functions with applications

Abstract: There is a strong connection between convexity and inequalities. So, techniques from each concept ap

Palabras claves:

Hermite-hadamard inequality, Hölder inequality, Quasi-convex function

Abdeljawad T., Miguel Vivas Cortez, Mohammed P.O., Yenny Rangel-Oliveros

q<inf>1</inf> q<inf>2</inf>-Ostrowski-Type Integral Inequalities Involving Property of Generalized Higher-Order Strongly n-Polynomial Preinvexity

Abstract: Quantum calculus has numerous applications in mathematics. This novel class of functions may be used

Palabras claves:

preinvex function, preinvex higher-order generalized strongly n-polynomial preinvex function, q q -Hölder integral inequality function 1 2, q q -Ostrowski-type inequalities 1 2

Kalsoom H., Miguel Vivas Cortez

Generalized fractional Hermite-Hadamard type inclusions for co-ordinated convex interval-valued functions

Abstract: In this article, we introduce the notions of generalized fractional integrals for the interval-value

Palabras claves:

co-ordinated convex, fractional integral, H-H inclusion, integral inclusions, IVFs

Ali M.A., Budak H., Chasreechai S., Kara H., Miguel Vivas Cortez

Refinements for Hermite-Hadamard type inequalities for operator h-convex function

Abstract: In the present paper we introduce the notion of operator h-convex function. Also, we obtain new Jens

Palabras claves:

Hermite- Hadamard inequalities, Jensen inequalities type, Operator convex functions, Operator h- convex functions, Self-adjoint operators

Hernández J.E.H., Miguel Vivas Cortez

Hermite-hadamard-fejér type inequalities for strongly (s,m)-convex functions with modulus c, in second sense

Abstract: We introduce the class of strongly (s,m)-convex functions modulus c > 0 in the second sense, and pro

Palabras claves:

Convexity generalized, Inequalities of fejér type, Inequalities of hermite type

Giménez J., Miguel Vivas Cortez, Mireya Rafaela Bracamonte P

Hermite–jensen–mercer-type inequalities via caputo–fabrizio fractional integral for h-convex function

Abstract: Integral inequalities involving many fractional integral operators are used to solve various fractio

Palabras claves:

Caputo–Fabrizio fractional integral, Convex function, H-convex function, Hermite–Hadamard inequality, Jensen inequality, Jensen–Mercer inequality

Kashuri A., Miguel Vivas Cortez, Sajid S., Saleem M.S., Zahoor M.S.

New hermite-Hadamard and Jensen type inequalities for h-convex functions on fractal sets

Abstract: In this paper, some new Jensen and Hermite-Hadamard inequalities for h-convex functions on fractal s

Palabras claves:

Fractal sets, Generalized convexity, H-convex functions, Hermite-Hadamard type inequality, Jensen inequality

Hernández J.E.H., Merentes N., Miguel Vivas Cortez

Quantum trapezium-type inequalities using generalized ϕ-convex functions

Abstract: In this work, a study is conducted on the Hermite-Hadamard inequality using a class of generalized c

Palabras claves:

Generalized convexity, Hermite-hadamard inequality, Quantum estimates, Special functions

Hernández J.E.H., Kashuri A., Liko R., Miguel Vivas Cortez

On Non Conformable Fractional Laplace Transform

Abstract: In the present paper, the main theorems of the classical Laplace transform are generalized in the no

Palabras claves:

Fractional Calculus, Laplace fractional transform

Herndndez J.E.H., Miguel Vivas Cortez, Oswalde Larreal, Valdes J.E.N., Velasco J.V.

Some Fractional Inequalities of Ostrowski-Type and related Applications

Abstract: A significant area in the region of pure and applied mathematics is the integral inequality. As it i

Palabras claves:

Generalized derivatives and integral, Laplace’s equation

Miguel Vivas Cortez, Sajid S., Saleem M.S.