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Simpson’s Second-Type Inequalities for Co-Ordinated Convex Functions and Applications for Cubature Formulas

Sabah Iftikhar, Samet Erden, Muhammad Aamir Ali, Jamel Baili, Hijaz Ahmad

2022Fractal and Fractional21 citationsDOIOpen Access PDF

Abstract

Inequality theory has attracted considerable attention from scientists because it can be used in many fields. In particular, Hermite–Hadamard and Simpson inequalities based on convex functions have become a cornerstone in pure and applied mathematics. We deal with Simpson’s second-type inequalities based on coordinated convex functions in this work. In this paper, we first introduce Simpson’s second-type integral inequalities for two-variable functions whose second-order partial derivatives in modulus are convex on the coordinates. In addition, similar results are acquired by considering that powers of the absolute value of second-order partial derivatives of these two-variable functions are convex on the coordinates. Finally, some applications for Simpson’s 3/8 cubature formula are given.

Topics & Concepts

MathematicsHermite polynomialsConvex functionRegular polygonType (biology)Hadamard transformVariable (mathematics)InequalityConvex analysisPure mathematicsApplied mathematicsOrder (exchange)Convex optimizationCalculus (dental)Mathematical analysisGeometryBiologyEconomicsDentistryEcologyMedicineFinanceMathematical Inequalities and ApplicationsMathematical functions and polynomialsIterative Methods for Nonlinear Equations
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