DISCRETIZATION OF A MATHEMATICAL MODEL FOR
TUMOR-IMMUNE SYSTEM INTERACTION WITH
PIECEWISE CONSTANT ARGUMENTS
S. Kartal, and F. Gurcan (Eds.) Applied Mathematics and Sciences: An International Journal (MathSJ), 1 (1):
57-65(May 2014)
Abstract
The present study deals with the analysis of a Lotka-Volterra model describing competition between tumor
and immune cells. The model consists of differential equations with piecewise constant arguments and
based on metamodel constructed by Stepanova. Using the method of reduction to discrete equations, it is
obtained a system of difference equations from the system of differential equations. In order to get local
and global stability conditions of the positive equilibrium point of the system, we use Schur-Cohn criterion
and Lyapunov function that is constructed. Moreover, it is shown that periodic solutions occur as a
consequence of Neimark-Sacker bifurcation.
%0 Journal Article
%1 discretization
%D 2014
%E Kartal, Senol
%E Gurcan, Fuat
%J Applied Mathematics and Sciences: An International Journal (MathSJ)
%K arguments bifurcation constant difference equation piecewise stability
%N 1
%P 57-65
%T DISCRETIZATION OF A MATHEMATICAL MODEL FOR
TUMOR-IMMUNE SYSTEM INTERACTION WITH
PIECEWISE CONSTANT ARGUMENTS
%U https://airccse.com/mathsj/papers/1114mathsj05.pdf
%V 1
%X The present study deals with the analysis of a Lotka-Volterra model describing competition between tumor
and immune cells. The model consists of differential equations with piecewise constant arguments and
based on metamodel constructed by Stepanova. Using the method of reduction to discrete equations, it is
obtained a system of difference equations from the system of differential equations. In order to get local
and global stability conditions of the positive equilibrium point of the system, we use Schur-Cohn criterion
and Lyapunov function that is constructed. Moreover, it is shown that periodic solutions occur as a
consequence of Neimark-Sacker bifurcation.
@article{discretization,
abstract = {The present study deals with the analysis of a Lotka-Volterra model describing competition between tumor
and immune cells. The model consists of differential equations with piecewise constant arguments and
based on metamodel constructed by Stepanova. Using the method of reduction to discrete equations, it is
obtained a system of difference equations from the system of differential equations. In order to get local
and global stability conditions of the positive equilibrium point of the system, we use Schur-Cohn criterion
and Lyapunov function that is constructed. Moreover, it is shown that periodic solutions occur as a
consequence of Neimark-Sacker bifurcation.
},
added-at = {2021-03-24T04:47:12.000+0100},
biburl = {https://www.bibsonomy.org/bibtex/242cdb9696346bee14aafb83f9ab18ae5/journalmathsj},
editor = {Kartal, Senol and Gurcan, Fuat},
interhash = {8e3e9ab94a9ee498db5da0e659668ec2},
intrahash = {42cdb9696346bee14aafb83f9ab18ae5},
journal = {Applied Mathematics and Sciences: An International Journal (MathSJ)},
keywords = {arguments bifurcation constant difference equation piecewise stability},
month = may,
number = 1,
pages = {57-65},
timestamp = {2021-03-24T04:47:12.000+0100},
title = {DISCRETIZATION OF A MATHEMATICAL MODEL FOR
TUMOR-IMMUNE SYSTEM INTERACTION WITH
PIECEWISE CONSTANT ARGUMENTS},
url = {https://airccse.com/mathsj/papers/1114mathsj05.pdf},
volume = 1,
year = 2014
}