This work is licensed under the Creative Commons Attribution 4.0 International License.
T. Abdeljawad, On conformable fractional calculus, Journal of Computational and Applied Mathematics, 279 (2015), 57–66.AbdeljawadT.On conformable fractional calculusJournal of Computational and Applied Mathematics2792015576610.1016/j.cam.2014.10.016Search in Google Scholar
R. Khalil, M. Al Horani, A. Yousef, M. Sababheh, A new definition of fractional derivative, Journal of Computational and Applied Mathematics, 264 (2014), 65–70.KhalilR.Al HoraniM.YousefA.SababhehM.A new definition of fractional derivativeJournal of Computational and Applied Mathematics2642014657010.1016/j.cam.2014.01.002Search in Google Scholar
A. Yalçın, Integral inequalities for different kinds of convex functions via conformable fractional integrals, Master Thesis, Ağrı İbrahim Çeçen University, 2016.YalçınA.Integral inequalities for different kinds of convex functions via conformable fractional integralsMaster Thesis,Ağrıİbrahim Çeçen University2016Search in Google Scholar
E.D. Rainville, Special Functions, The Mcmillan Company, New York, 1960.RainvilleE.D.Special FunctionsThe Mcmillan CompanyNew York1960Search in Google Scholar
J. Pečarić, F. Proschan and Y.L. Tong, Convex Functions, Partial Orderings and Statistical Applications, Academic Press (1992), Inc.PečarićJ.ProschanF.TongY.L.Convex Functions, Partial Orderings and Statistical ApplicationsAcademic Press Inc.1992Search in Google Scholar
H. Hudzik, L. Maligranda, Some remarks on s−convex functions, Aequationes Math., 48 (1994) 100–111.HudzikH.MaligrandaL.Some remarks on s−convex functionsAequationes Math.48199410011110.1007/BF01837981Search in Google Scholar
W.W. Breckner, Stetigkeitsaussagen für eine Klasse verallgemeinerter konvexer funktionen in topologischen linearen Raumen, Pupl. Inst. Math., 23 (1978) 13–20.BrecknerW.W.Stetigkeitsaussagen für eine Klasse verallgemeinerter konvexer funktionen in topologischen linearen RaumenPupl. Inst. Math.2319781320Search in Google Scholar
W.W. Breckner, Continuity of generalized convex and generalized concave set-valued functions, Rev Anal. Numér. Thkor. Approx., 22 (1993) 39–51.BrecknerW.W.Continuity of generalized convex and generalized concave set-valued functionsRev Anal. Numér. Thkor. Approx.2219933951Search in Google Scholar
A. Ekinci and M. E. Ozdemir, Some New Integral Inequalities Via Riemann Liouville Integral Operators, Applied and Computational Mathematics, 3 (2019), 288–295.EkinciA.OzdemirM. E.Some New Integral Inequalities Via Riemann Liouville Integral OperatorsApplied and Computational Mathematics32019288295Search in Google Scholar
A. Ekinci and M.E. Özdemir, Some New Integral Inequalities Via Riemann-Liouville Integral Operators, Applied and Computational Mathematics, Vol. 18, No:3, 2019, pages: 288–295.EkinciA.ÖzdemirM.E.Some New Integral Inequalities Via Riemann-Liouville Integral OperatorsApplied and Computational Mathematics1832019288295Search in Google Scholar
D. Nie, S. Rashid, A.O. Akdemir, D. Baleanu and J.-B. Liu, On Some New Weighted Inequalities for Differentiable Exponentially Convex and Exponentially Quasi-Convex Functions with Applications, Mathematics 2019, 7(8), 727.NieD.RashidS.AkdemirA.O.BaleanuD.LiuJ.-B.On Some New Weighted Inequalities for Differentiable Exponentially Convex and Exponentially Quasi-Convex Functions with ApplicationsMathematics20197872710.3390/math7080727Search in Google Scholar
A.O.Akdemir, A. Ekinci and E. Set, Conformable Fractional Integrals And Related New Integral Inequalities, Journal of Nonlinear and Convex Analysis, Volume 18, Number 4, 2017, 661–674.AkdemirA.O.EkinciA.SetE.Conformable Fractional Integrals And Related New Integral InequalitiesJournal of Nonlinear and Convex Analysis1842017661674Search in Google Scholar
A. Kashuri and R. Liko, Ostrowski Type Conformable Fractional Integrals For Generalized (g,s,m,φ)-Preinvex Functions, Turkish Journal of Inequalities, 2 (2) (2018), Pages 54–70.KashuriA.LikoR.Ostrowski Type Conformable Fractional Integrals For Generalized (g,s,m,φ)-Preinvex FunctionsTurkish Journal of Inequalities2220185470Search in Google Scholar
M. Kunt and İ. İşcan, Fractional Hermite-Hadamard-Fejer Type Inequalities For Ga-Convex Functions, Turkish Journal of Inequalities, 2 (1) (2018), Pages 1–20.KuntM.İşcanİ.Fractional Hermite-Hadamard-Fejer Type Inequalities For Ga-Convex FunctionsTurkish Journal of Inequalities21201812010.1515/mjpaa-2017-0003Search in Google Scholar
