On an extension of the Mikusinski type operational calculus for the Caputo fractional derivative

被引:3
|
作者
Al-Kandari, M. [1 ]
Hanna, L. A-M. [1 ]
Luchko, Yu. [2 ]
机构
[1] Kuwait Univ, Dept Math, Kuwait, Kuwait
[2] Beuth Tech Univ Appl Sci, Dept Math Phys & Chem, Berlin, Germany
来源
INTEGRAL TRANSFORMS AND SPECIAL FUNCTIONS | 2021年 / 32卷 / 09期
关键词
Caputo fractional derivative; convolutions; operational calculus; convolution quotients fields; Mittag-Leffler function; fields homomorphisms; DIFFERENTIAL-EQUATIONS;
D O I
10.1080/10652469.2020.1833194
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper, a two-parameter extension of the operational calculus of Mikusinski's type for the Caputo fractional derivative is presented. The first parameter is connected with the rings of functions that are used as a basis for construction of the convolution quotients fields. The convolutions by themselves are characterized by another parameter. The obtained two-parameter operational calculi are compared each to other and some homomorphisms between the fields of convolution quotients are established.
引用
收藏
页码:710 / 725
页数:16
相关论文
共 50 条
  • [31] Variational Problems Involving a Caputo-Type Fractional Derivative
    Ricardo Almeida
    Journal of Optimization Theory and Applications, 2017, 174 : 276 - 294
  • [32] Inequalities for different type of functions via Caputo fractional derivative
    Ucar, Deniz
    AIMS MATHEMATICS, 2022, 7 (07): : 12815 - 12826
  • [33] Caputo-type fractional derivative of a hypergeometric integral operator
    Rao, Alka
    Garg, Mridula
    Kalla, S. L.
    KUWAIT JOURNAL OF SCIENCE & ENGINEERING, 2010, 37 (1A): : 15 - 29
  • [34] On Caputo modification of Hadamard-type fractional derivative and fractional Taylor series
    Zafar, Rashida
    Rehman, Mujeeb Ur
    Shams, Moniba
    ADVANCES IN DIFFERENCE EQUATIONS, 2020, 2020 (01)
  • [35] A Tikhonov-type regularization method for Caputo fractional derivative
    Duc, Nguyen Van
    Nguyen, Thi-Phong
    Ha, Nguyen Phuong
    Anh, Nguyen The
    Manh, Luu Duc
    Bao, Hoang Cong Gia
    NUMERICAL ALGORITHMS, 2024, : 441 - 462
  • [36] Variational Problems Involving a Caputo-Type Fractional Derivative
    Almeida, Ricardo
    JOURNAL OF OPTIMIZATION THEORY AND APPLICATIONS, 2017, 174 (01) : 276 - 294
  • [37] An Extension of the Picard Theorem to Fractional Differential Equations with a Caputo-Fabrizio Derivative
    Marasi, H. R.
    Joujehi, A. Soltani
    Aydi, H.
    JOURNAL OF FUNCTION SPACES, 2021, 2021
  • [38] Mikusinski's operational calculus with algebraic foundations and applications to Bessel functions
    Bengochea, Gabriel
    Lopez, Gabriel
    INTEGRAL TRANSFORMS AND SPECIAL FUNCTIONS, 2014, 25 (04) : 272 - 282
  • [39] Solving Prabhakar differential equations using Mikusinski's operational calculus
    Rani, Noosheza
    Fernandez, Arran
    COMPUTATIONAL & APPLIED MATHEMATICS, 2022, 41 (03):
  • [40] Fractional Bernstein operational matrices for solving integro-differential equations involved by Caputo fractional derivative
    Alshbool, M. H. T.
    Mohammad, Mutaz
    Isik, Osman
    Hashim, Ishak
    RESULTS IN APPLIED MATHEMATICS, 2022, 14
12345