APPROXIMATION OF THE ERDELYI-KOBER OPERATOR WITH APPLICATION TO THE TIME-FRACTIONAL POROUS MEDIUM EQUATION

被引:41
作者
Plociniczak, Lukasz [1 ]
机构
[1] Wroclaw Univ Technol, Inst Math & Comp Sci, PL-50372 Wroclaw, Poland
来源
SIAM JOURNAL ON APPLIED MATHEMATICS | 2014年 / 74卷 / 04期
关键词
fractional calculus; porous-medium equation; anomalous diffusion; approximate solution; ANOMALOUS DIFFUSION; WATER TRANSPORT; RICHARDS EQUATION; ABSORPTION; ORDER; FLOW;
D O I
10.1137/130942450
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
This paper describes a method of approximating equations with the Erdelyi-Kober fractional operator which arise in mathematical descriptions of anomalous diffusion. We prove a theorem on the exact form of the approximating series and provide an illustration by considering the fractional porous-medium equation applied to model moisture diffusion in building materials. We obtain some approximate analytical solutions of our problem which accurately fit the experimental data (better than other models found in the literature). This accuracy is also verified numerically. Since they are very quick and easy to implement, our approximations can be valuable for practitioners and experimentalists.
引用
收藏
页码:1219 / 1237
页数:19
相关论文
共 50 条
[1]   ERDELYI-KOBER FRACTIONAL DIFFUSION [J].
Pagnini, Gianni .
FRACTIONAL CALCULUS AND APPLIED ANALYSIS, 2012, 15 (01) :117-127
[2]   Analytical studies of a time-fractional porous medium equation. Derivation, approximation and applications [J].
Plociniczak, Lukasz .
COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION, 2015, 24 (1-3) :169-183
[3]   NUMERICAL METHOD FOR THE TIME-FRACTIONAL POROUS MEDIUM EQUATION [J].
Plociniczak, Lukasz .
SIAM JOURNAL ON NUMERICAL ANALYSIS, 2019, 57 (02) :638-656
[4]   On a quadratic integral equation with supremum involving Erdelyi-Kober fractional order [J].
Darwish, Mohamed Abdalla ;
Sadarangani, Kishin .
MATHEMATISCHE NACHRICHTEN, 2015, 288 (5-6) :566-576
[5]   Numerical scheme for Erdelyi-Kober fractional diffusion equation using Galerkin-Hermite method [J].
Plociniczak, Lukasz ;
Switala, Mateusz .
FRACTIONAL CALCULUS AND APPLIED ANALYSIS, 2022, 25 (04) :1651-1687
[6]   Existence of solutions for Erdelyi-Kober fractional integral boundary value problems with p(t)-Laplacian operator [J].
Shen, Xiaohui ;
Shen, Tengfei .
ADVANCES IN DIFFERENCE EQUATIONS, 2020, 2020 (01)
[7]   MULTIDIMENSIONAL GENERALIZED ERDELYI-KOBER OPERATOR AND ITS APPLICATION TO SOLVING CAUCHY PROBLEMS FOR DIFFERENTIAL EQUATIONS WITH SINGULAR COEFFICIENTS [J].
Karimov, Shakhobiddin T. .
FRACTIONAL CALCULUS AND APPLIED ANALYSIS, 2015, 18 (04) :845-861
[8]   Second order scheme for self-similar solutions of a time-fractional porous medium equation on the half-line [J].
Okrasinska-Plociniczak, Hanna ;
Plociniczak, Lukasz .
APPLIED MATHEMATICS AND COMPUTATION, 2022, 424
[9]   Solvability of fully nonlinear functional equations involving Erdelyi-Kober fractional integrals on the unbounded interval [J].
Wang, JinRong ;
Zhu, Chun ;
Feckan, Michal .
OPTIMIZATION, 2014, 63 (08) :1235-1248
[10]   DIFFUSIVITY IDENTIFICATION IN A NONLINEAR TIME-FRACTIONAL DIFFUSION EQUATION [J].
Plociniczak, Lukasz .
FRACTIONAL CALCULUS AND APPLIED ANALYSIS, 2016, 19 (04) :843-866
12345