        TY  - JOUR
T1  - Caputo-Katugampola-type implicit fractional differential equation with anti-periodic boundary conditions
AU  - Redhwan, Saleh
AU  - Shaikh, Sadikali
AU  - Abdo, Mohammed
PY  - 2022
DA  - March
DO  - 10.53006/rna.974148
JF  - Results in Nonlinear Analysis
JO  - RNA
PB  - Erdal KARAPINAR
WT  - DergiPark
SN  - 2636-7556
SP  - 12
EP  - 28
VL  - 5
IS  - 1
LA  - en
AB  - The given article describes the implicit fractional dierential equation with anti-periodic boundary conditionsin the frame of Caputo-Katugampola fractional derivative. We obtain an analogous integral equation of thegiven problem and prove the existence and uniqueness results of such a problem using the Banach andKrasnoselskii xed point theorems. Further, by applying generalized Gronwall inequality, the Ulam-Hyersstability results are discussed. To show the eectiveness of the acquired results, convenient examples arepresented.
KW  - implicit fractional differential equation
KW  - fractional derivative and fractional integral
KW  - anti-periodic conditions
KW  - fixed point theorem
KW  - Gronwall inequality
CR  - [1] S.Y. Al-Mayyahi, M.S. Abdo, S.S. Redhwan, B.N. Abood, Boundary value problems for a coupled system of Hadamard-type
fractional differential equations. IAENG International Journal of Applied Mathematics, 51(1) (2021) 1-10.
CR  - [2] S. Abbas, M. Benchohra, J.R. Graef, Implicit fractional differential and integral equations. de Gruyter, (2018).
CR  - [3] R. Almeida, A Gronwall inequality for a general Caputo fractional operator, arXiv preprint arXiv:1705.10079. (2017).
CR  - [4] E. Alvarez, C. Lizama, R. Ponce, Weighted pseudo anti-periodic solutions for fractional integro-differential equations in
Banach spaces, Applied Mathematics and Computation, 259 (2015)164-172.
CR  - [5] B. Ahmad, J.J. Nieto, Anti-periodic fractional boundary value problems, Computers &amp; Mathematics with Applications,
62 (2011) 1150-1156.
CR  - [6] M. ALMALAHI, S.K. PANCHAL, Existence and stability results of relaxation fractional differential equations with Hilfer-
Katugampola fractional derivative, Advances in the Theory of Nonlinear Analysis and its Application, 4(4) 299-315.
CR  - [7] M.S. Abdo, S.K. Panchal, Some new uniqueness results of solutions to nonlinear fractional integro-differential equations,
Annals of Pure and Applied Mathematics, 16 (1) (2018) 345-352.
CR  - [8] B.N. Abood, S.S. Redhwan, M.S. Abdo, Analytical and approximate solutions for generalized fractional quadratic integral
equation, Nonlinear Functional Analysis and Applications, 26(3) (2021) 497-512.
CR  - [9] M. Benchohra, S. Bouriah, M.A. Darwish, Nonlinear boundary value problem for implicit differential equations of fractional
order in Banach spaces, Fixed Point Theory, 18 (2017) 457-470.
CR  - [10] M. Benchohra, S. Bouriah, Existence and stability results for nonlinear boundary value problem for implicit differential
equations of fractional order, Moroccan Journal of Pure and Applied Analysis, 1(1) (2015) 22-37.
CR  - [11] A. Boutiara, K. Guerbati, M. Benbachir, Caputo-Hadamard fractional differential equation with three-point boundary
conditions in Banach spaces, AIMS Mathematics. , 5(1) (2019) 259-272.
CR  - [12] T.A. Burton, C. KirkÙ, A fixed point theorem of Krasnoselskii Schaefer type, Mathematische Nachrichten, 189 (1998),
23-31.
CR  - [13] M. Benchohra, J.E. Lazreg, Nonlinear fractional implicit differential equations, Communications in Applied Analysis, 17
(2013) 471-482.
CR  - [14] S. Hamani, W. Benhamida, J. Henderson, Boundary value problems for Caputo-Hadamard fractional differential equations,
Advances in the Theory of Nonlinear Analysis and its Application, 2(3) (2015) 138-145.
CR  - [15] R. Herrmann, Fractional calculus: an introduction for physicists, (2011).
CR  - [16] G. Jumarie, On the representation of fractional Brownian motion as an integral with respect to (dt) a, Applied Mathematics
Letters, 18 (7) (2005) 739-748.
CR  - [17] U.N. Katugampola, Existence and uniqueness results for a class of generalized fractional differential equations. Preprint.
arXiv:1411.5229. (2014).
CR  - [18] U.N. Katugampola, A new approach to generalized fractional derivatives, Bulletin of Mathematical Analysis and Applications, 6 (2014) 1-15.
CR  - [19] U.N. Katugampola, New approach to a generalized fractional integral, Applied Mathematics and Computation, 218 (3)
(2011) 860-865.
CR  - [20] U.N. Katugampola, Mellin transforms of the generalized fractional integrals and derivatives, Applied Mathematics and
Computation, 257 (2015) 566-580.
CR  - [21] A.A. Kilbas, H.M. Srivastava, J.J. Trujillo, Theory and applications of fractional differential equations, Elsevier Science
Limited, 204 (2006).
CR  - [22] N.H. Luc, D. Baleanu, N.H. Can, Reconstructing the right-hand side of a fractional subdiffusion equation from the final
data, Journal of Inequalities and Applications, 2020(1) (2020) 1-15.
CR  - [23] A.B. Malinowska, T. Odzijewicz, D.F.M. Torres, Advanced Methods in the Fractional Calculus of Variations, Springer:
Berlin. (2015).
CR  - [24] B. Nghia, Existence of a mild solution to fractional differential equations with ψ-Caputo derivative, and its ψ-Holder
continuity, Advances in the Theory of Nonlinear Analysis and its Application, 5(3) 337-350.
CR  - [25] D.S. Oliveira, E. Capelas, de. Oliveira, Hilfer-Katugampola fractional derivatives, Computational and Applied Mathematics, 37 (2018) 3672-3690.
CR  - [26] I. Podlubny, Fractional Differential Equations, Academic Press: San Diego, (1999).
CR  - [27] S.S. Redhwan, S.L. Shaikh, M.S. Abdo, Implicit fractional differential equation with anti-periodic boundary condition
involving Caputo-Katugampola type, AIMS MATHEMATICS, 5(4) (2020) 3714-3730.
CR  - [28] S.S. Redhwan, S.L. Shaikh, Analysis of implicit Type of a generalized fractional differential equations with nonlinear
integral boundary conditions, Journal of Mathematical Analysis and Modeling, 1(1) (2020) 64-76.
CR  - [29] S.S. Redhwan, S.L. Shaikh, M.S. Abdo, A coupled non-separated system of Hadamard-type fractional dierential equations,
Advances in the Theory of Nonlinear Analysis and its Applications, 1(1) (2022) 33-44.
CR  - [30] S.S. Redhwan, S.L. Shaikh, M.S. Abdo, Some properties of Sadik transform and its applications of fractional-order dynamical systems in control theory, Advances in the Theory of Nonlinear Analysis and its Application, 4(1) (2019) 51-66.
CR  - [31] S. Redhwan, S.L. Shaikh, Implicit fractional differential equation with nonlocal integral-multipoint boundary conditions in
the frame of Hilfer fractional derivative. Journal of Mathematical Analysis and Modeling, 2(1) (2021) 62-71.
CR  - [32] I.A. Rus, Ulam stabilities of ordinary differential equations in a Banach space, Carpathian Journal of Mathematics, 26
(2010), 103-107.
CR  - [33] S.G. Samko, A.A. Kilbas, O.I. Marichev, Fractional Integrals and Derivatives; Yverdon-les-Bains, (1993).
CR  - [34] J.V.C. Sousa, E.C. Oliveira, A Gronwall inequality and the Cauchy-type problem by means of ψ-Hilfer operator, arXiv
preprint arXiv:1709.03634, (2017).
CR  - [35] T.N. Thach, T.N. Huy, P.T.M. Tam, M.N. Minh, N.H. Can, Identi?cation of an inverse source problem for time-fractional
diffusion equation with random noise, Mathematical Methods in the Applied Sciences, 42(1) (2019) 204-218.
UR  - https://doi.org/10.53006/rna.974148
L1  - https://dergipark.org.tr/tr/download/article-file/1890726
ER  -