Kragujevac Journal of Mathematics
University of Kragujevac - Faculty of Science

[1]   T. Abdeljawad, On conformable fractional calculus, J. Comput. Appl. Math. 279 (2015), 57–66.

[2]   P. Agarwal, S. S. Dragomir, M. Jleli and B. Samet (Eds.), Advances in Mathematical Inequalities and Applications, Birkhuser, Basel, 2018.

[3]   P. Agarwal, S. Deniz S. Jain, A. A. Alderremy and S. Aly, A new analysis of a partial differential equation arising in biology and population genetics via semi analytical techniques, Phys. A, DOI 10.1016/j.physa.2019.122769.

[4]   A. A. El-Sayed and P. Agarwal, Numerical solution of multiterm variableorder fractional differential equations via shifted Legendre polynomials, Math. Methods Appl. Sci. 42 (2019), 3978–3991.

[5]   P. M. Guzman, G. Langton, L. M. Lugo, J. Medina and J. E. Nápoles Valdés, A new definition of a fractional derivative of local type, J. Math. Anal. 9(2) (2018), 88–98.

[6]   C. Hetal, The fractional Laplace transform solution for fractional differential equation of the oscillator in the presence of an external forces, International Journal of Advanced Science and Technology 5(2) (2018), 6–11.

[7]   S. Jain and P. Agarwal, On new applications of fractional calculus, Bol. Soc. Parana. Mat. (3) 37(3) (2019), 113–118.

[8]   R. Khalil, M. Al Horani, A. Yousef and M. Sababheh, A new definition of fractional derivative, J. Comput. Appl. Math. 264 (2014), 65–70.

[9]   L. Kexue and P. Jigen, Laplace transform and fractional differential equations, Appl. Math. Lett. 24 (2011), 2019–2023.

[10]   N. A. Khan, O. A. Razzaq and M. Ayaz, Some properties and applications of conformable fractional Laplace transform (CFLT), J. Fract. Calc. Appl. 9(1) (2018), 72–81.

[11]   S. D. Lin and C. H. Lu, Laplace transform for solving some families of fractional differential equations and its applications, Adv. Difference Equ. 2013 (2013), Paper ID 137, 9 pages.

[12]   S. Liang, R. Wu and L. Chen, Laplace transform of fractional order differential equations, Electron. J. Differential Equations 2015(139) (2015), 1–15.

[13]   R. R. Nigmatullina and P. Agarwal, Direct evaluation of the desired correlations: Verication on real data, Phys. A 534 (2019), Paper ID 121558.

[14]   J. E. Nápoles, P. M. Guzman and L. M. Lugo, Some new results on non conformable fractional calculus, Adv. Dyn. Syst. Appl. 13(2) (2018), 167–175.

[15]   J. E. Nápoles, P. M. Guzman and L. M. Lugo, On the stability of solutions of fractional non conformable differential equations, Stud. Univ. Babes-Bolyai Math. (to appear).

[16]   M. Pospísil and L. P. Skripková, Sturm’s theorems for conformable fractional differential equations, Math. Commun. 21 (2016), 273–281.

[17]   M. Ruzhansky, Y. Je Cho, P. Agarwal and I. Area, Advances in Real and Complex Analysis with Applications, Springer, Singapore, 2017.

[18]   S. Rekhviashvili, A. Pskhu, P. Agarwal and S. Jain, Application of the fractional oscillator model to describe damped vibrations, Turkish Journal of Physics 43(3) (2019), 236–242.

[19]   F. S. Silva, D. M. Moreira and M. A. Moret, Conformable Laplace transform of fractional differential equations, Axioms 7(3) (2018), 55.

[20]   S. Salahshour, A. Ahmadian, N. Senu, D. Baleanu and P. Agarwal, On analytical solutions of the fractional differential equation with uncertainty: application to the Basset problem, Entropy 17(2) (2015), 885–902.

[21]   X. Zhang, P. Agarwal, Z. Liu and H. Peng, The general solution for impulsive differential equations with Riemann-Liouville fractional-order q ∈ (1, 2), Open Math. 13(1) (2015), 908-930.