Numerical solutions of the reaction diffusion system by using exponential cubic B-spline collocation algorithms

被引:34
作者
Ersoy, Ozlem [1 ]
Dag, Idris [1 ]
机构
[1] Eskisehir Osmangazi Univ, Math Comp Dept, TR-26480 Eskisehir, Turkey
来源
OPEN PHYSICS | 2015年 / 13卷 / 01期
关键词
finite element method; collocation method; reaction-diffusion equations; exponential cubic B-spline; nonlinear differential equation;
D O I
10.1515/phys-2015-0047
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
The solutions of the reaction-diffusion system are given by method of collocation based on the exponential B-splines. Thus the reaction-diffusion system turns into an iterative banded algebraic matrix equation. Solution of the matrix equation is carried out byway of Thomas algorithm. The present methods test on both linear and nonlinear problems. The results are documented to compare with some earlier studies by use of L-infinity and relative error norm for problems respectively.
引用
收藏
页码:414 / 427
页数:14
相关论文
共 20 条
[1]  
Abbas M., 2014, PLOS ONE, V9, P1, DOI DOI 10.1371/J0URNAL.P0NE.0083265
[2]  
Aronson D.G., 2006, LECT NOTES MATH, V446, P5
[3]   An adaptive spline wavelet ADI (SW-ADI) method for two-dimensional reaction-diffusion equations [J].
Cai, W ;
Zhang, W .
JOURNAL OF COMPUTATIONAL PHYSICS, 1998, 139 (01) :92-126
[4]   Numerical methods for stiff reaction-diffusion systems [J].
Chou, Ching-Shan ;
Zhang, Yong-Tao ;
Zhao, Rui ;
Nie, Qing .
DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES B, 2007, 7 (03) :515-525
[5]  
Dag I., 2015, ADV NUMERICAL ANAL, V2015, P1
[6]   An ADI extrapolated Crank-Nicolson orthogonal spline collocation method for nonlinear reaction-diffusion systems [J].
Fernandes, Ryan I. ;
Fairweather, Graeme .
JOURNAL OF COMPUTATIONAL PHYSICS, 2012, 231 (19) :6248-6267
[7]   THEORY OF EXPONENTIAL SPLINES [J].
MCCARTIN, BJ .
JOURNAL OF APPROXIMATION THEORY, 1991, 66 (01) :1-23
[8]   THE DEVELOPMENT OF TRAVELING WAVES IN A SIMPLE ISOTHERMAL CHEMICAL-SYSTEM .1. QUADRATIC AUTO-CATALYSIS WITH LINEAR DECAY [J].
MERKIN, JH ;
NEEDHAM, DJ ;
SCOTT, SK .
PROCEEDINGS OF THE ROYAL SOCIETY OF LONDON SERIES A-MATHEMATICAL AND PHYSICAL SCIENCES, 1989, 424 (1866) :187-209
[9]   Numerical solutions of nonlinear Fisher's reaction–diffusion equation with modified cubic B-spline collocation method [J].
Mittal R.C. ;
Jain R.K. .
Mathematical Sciences, 2013, 7 (1)
[10]  
Mohammadi Reza., 2013, Applied Mathematics, V4, P933, DOI DOI 10.4236/AM.2013.46129
12