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• J. E. Pecaric, F. Proschan, Y. L. Tong, Convex Functions, Partial Orderings, and Statistical Applications, Mathematics in Science and Engineering 187, Academic Press, Inc., Boston, MA, 1992.
• B. T. Polyak, Existence Theorems and Convergence of Minimizing Sequences in Extremum Problems with Restrictions, Soviet Mathematics Doklady 7 (1966) 72-75.
• S. S. Dragomir, J. E. Pecaric, L. E. Persson, Some Inequalities of Hadamard Type, Soochow Journal of Mathematics 21(3) (1995) 335-341.
• H. Angulo, J. Gimenez, A. M. Moros, K. Nikodem, On Strongly h-convex Functions, Annals of Functional Analysis 2(2) (2011) 85-91.
• E. K. Godunova, V. I. Levin, Inequalities for Functions of a Broad Class That Contains Convex, Monotone and Some Other Forms of Functions, (Russian) Numerical Mathematics and Mathematical Physics (Russian) 138-142, 166, Moskov. Gos. Ped. Inst., Moscow, 1985.
• S. S. Dragomir, Nequalities of Hermite-Hadamard Type for h-convex Functions on Linear Spaces, Proyecciones 34(4) (2015) 323-341.
• A. M. Ostrowski, Über Die Absolutabweichung Einer Differentiierbaren Funktion von Ihrem Integralmittelwert, (German) Commentarii Mathematici Helvetici 10(1) (1937) 226-227.
• G. Farid, U. N. Katugampola, M. Usman, Ostrowski-type Fractional Integral Inequalities for s-Godunova-Levin Functions via Katugampola Fractional Integrals, Open Journal of Mathematical Science 1 (2017) 97-110.
• G. Farid, A. U. Rehman, M. Usman, Ostrowski-type Fractional Integral Inequalities for s-Godunova-Levin Functions via k-fractional Integrals, Proyecciones 36(4) (2017) 753-767.
• S. Kermausuor, Simpson's Type Inequalities for Strongly (s,m)-convex Functions in the Second Sense and Applications, Open Journal of Mathematical Science 3(1) (2019) 74-83.
• B. Meftah, Some New Ostrowski's Inequalities for Functions Whose nth Derivatives are r-convex, International Journal of Analysis Article ID 6749213 (2016) 7 pages.
• B. Meftah, Some New Ostrowski's Inequalities for n-times Differentiable Mappings Which are Quasi-convex, Facta Universitatis, Series: Mathematics and Informatics 32(3) (2017) 319-327.
• B. Meftah, Some New Ostrowski's Inequalities for Functions Whose nth Derivatives are Logarithmically Convex, Annales Mathematicae Silesianae 32(1) (2018) 275-284.
• B. Meftah, Some Ostrowski's Inequalities for Functions Whose nth Derivatives are s-convex, Analele Universitatii din Oradea Fascicola Matematica 25(2) (2018) 185-212.
• B. Meftah, A. Azaizia, Fractional Ostrowski-type Inequalities for Functions Whose First Derivatives are MT-preinvex, Revista De Matematicas De la Universidad del Atlantico Paginas 6(1) (2019) 33-43.
• E. Set, M. E. Özdemir, M. Z. Sarıkaya, A. O. Akdemir, Ostrowski-type Inequalities for Strongly Convex Functions, Georgian Mathematical Journal 25(1) (2018) 109-115.
• M. Tun\cc, Ostrowski-type Inequalities via h-convex Functions with Applications to Special Means, Journal of Inequalities and Applications 2013(326) (2013) 1-10.
• M. Z. Sarikaya, N. Alp, On Hermite-Hadamard-Fejer Type Integral Inequalities for Generalized Convex Functions via Local Fractional Integrals, Open Journal of Mathematical Science 3(1) (2019) 273-284.
• E. Set, M. E. Özdemir, M. Z. Sarıkaya, New Inequalities of Ostrowski's Type for s-convex functions in the Second Sense with Applications, Facta Universitatis, Series: Mathematics and Informatics 27(1) (2012) 67-82.
• P. Cerone, S. S. Dragomir, Ostrowski-type Inequalities for Functions Whose Derivatives Satisfy Certain Convexity Assumptions, Demonstratio Mathematica 37(2) (2004) 299-308.
• M. A. Noor, K. I. Noor, M. U. Awan, Fractional Ostrowski Inequalities for s-Godunova-Levin Functions, International Journal of Analysis and Applications 5(2) (2014) 167-173.
• D. S. Mitrinovic, J. E. Pecaric, A. M. Fink, Classical and New Inequalities in Analysis, Mathematics and Its Applications (East European Series), 61. Kluwer Academic Publishers Group, Dordrecht 1993.