Identification Problem of Source Term of A Reaction Diffusion Equation
B. Zhang. International Journal of Advanced Computer Science and Applications(IJACSA), (2011)
Abstract
This paper will give the numerical difference scheme with Dirichlet boundary condition, and prove stability and convergence of the difference scheme, final numerical experiment results also confirm effectiveness of the algorithm.
%0 Journal Article
%1 IJACSA.2011.020815
%A Zhang, Bo
%D 2011
%J International Journal of Advanced Computer Science and Applications(IJACSA)
%K Fractional Numerical The derivative; difference gradient method. regularization scheme;
%N 8
%T Identification Problem of Source Term of A Reaction Diffusion Equation
%U http://ijacsa.thesai.org/
%V 2
%X This paper will give the numerical difference scheme with Dirichlet boundary condition, and prove stability and convergence of the difference scheme, final numerical experiment results also confirm effectiveness of the algorithm.
@article{IJACSA.2011.020815,
abstract = {This paper will give the numerical difference scheme with Dirichlet boundary condition, and prove stability and convergence of the difference scheme, final numerical experiment results also confirm effectiveness of the algorithm.
},
added-at = {2014-02-21T08:00:08.000+0100},
author = {Zhang, Bo},
biburl = {https://www.bibsonomy.org/bibtex/2c86dd83cc46150f64afafb8994d12192/thesaiorg},
interhash = {25fcfb901fa1a08637dcf9d8f1ad2ca5},
intrahash = {c86dd83cc46150f64afafb8994d12192},
journal = {International Journal of Advanced Computer Science and Applications(IJACSA)},
keywords = {Fractional Numerical The derivative; difference gradient method. regularization scheme;},
number = 8,
timestamp = {2014-02-21T08:00:08.000+0100},
title = {{Identification Problem of Source Term of A Reaction Diffusion Equation}},
url = {http://ijacsa.thesai.org/},
volume = 2,
year = 2011
}