Some New Fractal Milne-Type Integral Inequalities via Generalized Convexity with Applications
Badreddine Meftah, Abdelghani Lakhdari, Wedad Saleh, Adem Kılıçman
Abstract
This study aims to construct some new Milne-type integral inequalities for functions whose modulus of the local fractional derivatives is convex on the fractal set. To that end, we develop a novel generalized integral identity involving first-order generalized derivatives. Finally, as applications, some error estimates for the Milne-type quadrature formula and new inequalities for the generalized arithmetic and p-Logarithmic means are derived. This paper’s findings represent a significant improvement over previously published results. The paper’s ideas and formidable tools may inspire and motivate further research in this worthy and fascinating field.
Topics & Concepts
MathematicsConvexityFractalInequalityLogarithmType (biology)Quadrature (astronomy)Pure mathematicsRegular polygonApplied mathematicsModulus of continuityCalculus (dental)Mathematical analysisGeometryEconomicsMedicineElectrical engineeringFinancial economicsDentistryEngineeringEcologyBiologyMathematical Inequalities and ApplicationsFractional Differential Equations SolutionsMathematical functions and polynomials