Analysis of coupled systems of implicit impulsive fractional differential equations involving Hadamard derivatives

被引:0
|
作者
Usman Riaz
Akbar Zada
Zeeshan Ali
Yujun Cui
Jiafa Xu
机构
[1] University of Peshawar,Department of Mathematics
[2] Shandong University of Science and Technology,State Key Laboratory of Mining Disaster Prevention and Control Co
[3] Chongqing Normal University,founded by Shandong Province and the Ministry of Science and Technology
来源
Advances in Difference Equations | / 2019卷
关键词
Hadamard fractional derivative; Nonlinear implicit impulsive coupled system; Existence theory; Hyers–Ulam stability;
D O I
暂无
中图分类号
学科分类号
摘要
We present some results on the existence, uniqueness and Hyers–Ulam stability to the solution of an implicit coupled system of impulsive fractional differential equations having Hadamard type fractional derivative. Using a fixed point theorem of Kransnoselskii’s type, the existence and uniqueness results are obtained. Along these lines, different kinds of Hyers–Ulam stability are discussed. An example is given to illustrate the main theorems.
引用
收藏
相关论文
共 50 条
  • [31] Implicit coupled Hilfer-Hadamard fractional differential systems under weak topologies
    Abbas, Said
    Benchohra, Mouffak
    Hamidi, Naima
    Zhou, Yong
    ADVANCES IN DIFFERENCE EQUATIONS, 2018,
  • [32] Impulsive fractional differential equations with state-dependent delay involving the Caputo-Hadamard derivative
    Hammou, Amouria
    Hamani, Samira
    Henderson, Johnny
    FILOMAT, 2023, 37 (05) : 1581 - 1590
  • [33] Caputo-Hadamard implicit fractional differential equations with delay
    Krim, Salim
    Abbas, Said
    Benchohra, Mouffak
    SAO PAULO JOURNAL OF MATHEMATICAL SCIENCES, 2021, 15 (01): : 463 - 484
  • [34] Caputo-Hadamard implicit fractional differential equations with delay
    Salim Krim
    Saïd Abbas
    Mouffak Benchohra
    São Paulo Journal of Mathematical Sciences, 2021, 15 : 463 - 484
  • [35] Analysis of Implicit Type Nonlinear Dynamical Problem of Impulsive Fractional Differential Equations
    Ahmad, Naveed
    Ali, Zeeshan
    Shah, Kamal
    Zada, Akbar
    Rahman, Ghaus Ur
    COMPLEXITY, 2018,
  • [36] Coupled fractional differential equations involving Caputo-Hadamard derivative with nonlocal boundary conditions
    Nain, Ankit
    Vats, Ramesh
    Kumar, Avadhesh
    MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2021, 44 (05) : 4192 - 4204
  • [37] Coupled Systems of Sequential Caputo and Hadamard Fractional Differential Equations with Coupled Separated Boundary Conditions
    Asawasamrit, Suphawat
    Ntouyas, Sotiris K.
    Tariboon, Jessada
    Nithiarayaphaks, Woraphak
    SYMMETRY-BASEL, 2018, 10 (12):
  • [38] On Neutral Functional Differential Inclusions involving Hadamard Fractional Derivatives
    Ahmad, Bashir
    Alsaedi, Ahmed
    Ntouyas, Sotiris K.
    Al-Sulami, Hamed H.
    MATHEMATICS, 2019, 7 (11)
  • [39] On the concept and existence of solutions for fractional impulsive systems with Hadamard derivatives
    Wang, JinRong
    Zhang, Yuruo
    APPLIED MATHEMATICS LETTERS, 2015, 39 : 85 - 90
  • [40] Investigation of a Mild Solution to Coupled Systems of Impulsive Hybrid Fractional Differential Equations
    Hannabou, Mohamed
    Khalid, Hilal
    INTERNATIONAL JOURNAL OF DIFFERENTIAL EQUATIONS, 2019, 2019
12345