___

• Abdeljawad, T (2015), On conformable fractional calculus, Journal of Computational and Applied Mathematics 279, pp. 57–66.
• Anderson, D. R. (2016), Taylor’s formula and integral inequalities for conformable fractional deriva- tives, Contributions in Mathematics and Engineering, in Honor of Constantin Caratheodory, Springer, New York.
• Hammad M. A. and Khalil R. (2014), Conformable fractional heat differential equations, International Journal of Differential Equations and Applications 13( 3), pp. 177-183.
• Hammad M. A. and Khalil R. (2014), Abel’s formula and wronskian for conformable fractional differ- ential equations, International Journal of Differential Equations and Applications 13(3), pp. 177-183.
• Iyiola O.S.and Nwaeze E.R.(2016), Some new results on the new conformable fractional calculus with application using D’Alambert approach, Progr. Fract. Differ. Appl., 2(2), pp.115-122.
• Khalil R., Al horani M., Yousef A. and Sababheh M.(2014), A new definition of fractional derivative, Journal of Computational Apllied Mathematics, 264, pp. 65-70.
• Katugampola U.N. (2011), New approach to a generalized fractional integral, Appl. Math. Comput., 218(3), pp. 860–865.
• Katugampola U.N. (2014), New approach to generalized fractional derivatives, B. Math. Anal. App., 6(4), pp. 1–15.
• Kilbas A. A., Srivastava H.M. and Trujillo J.J. (2016), Theory and Applications of Fractional Differ- ential Equations, Elsevier B.V., Amsterdam, Netherlands.
• Samko, S.G., Kilbas, A.A. and Marichev, O.I. (1993), Fractional Integrals and Derivatives: Theory and Applications, Yverdon: Gordon and Breach.