Add to ORKGIn this work we study a system of ordinary differential equations which represent a mathematical model of cancer which has chaotic dynamics. In the study we use the bifurcation theory, especially the Hopf bifurcation and the period doubling bifurcation (flip), we also use the basic notion of symbolic dynamics. The model is analyzed from two points of view. In the first one we consider all the parameters as being fixed and vary only one of them, which is related to the growth rate of the healthy cells. For a determined critical value of this parameter, a Hopf bifurcation occurs in the equilibrium point representing the coexistence of the three types of cells (healthy cells, immune system cells and tumor cells), giving rise to the existence o...
AbstractA bifurcation analysis is developed for the initial value problem for a nonlinear system of ...
AbstractIn the present note, the chaotic behaviour of a class of infinite system of linear ODEs (wit...
We consider a dynamical model of cancer growth including three interacting cell populations of tumor...
One of the tumor growth model is formed by a three-dimensional continuous-time dynamical system, mod...
Despite mounting evidence that oncolytic viruses can be effective in treating cancer, understanding ...
Despite mounting evidence that oncolytic viruses can be effective in treating cancer, understanding ...
Cancer growth and decay can be modeled as a system of chaotic nonlinear differential equations. The ...
Dynamical systems modeling tumor growth have been investigated to determine the dynamics between tum...
The complexity of cancer has motivated the development of different approaches to understand the dyn...
In this paper, we study the bifurcation of a cancer model with completely unknown parameters. The bi...
We study complex oscillations generated by the de Pillis-Radunskaya model of cancer growth, a model ...
Cancer remains a significant burden in HIV-infected individuals. We present an HIV-1 dynamical model...
In this paper, we study the chaos and optimal control of cancer model with completely unknown par...
In this work we are going to investigate the scale formalism in discret mappings. In 1D mappings, we...
In this article, we investigate a tumor-immune and antigen-presenting cells population in the form o...
AbstractA bifurcation analysis is developed for the initial value problem for a nonlinear system of ...
AbstractIn the present note, the chaotic behaviour of a class of infinite system of linear ODEs (wit...
We consider a dynamical model of cancer growth including three interacting cell populations of tumor...
One of the tumor growth model is formed by a three-dimensional continuous-time dynamical system, mod...
Despite mounting evidence that oncolytic viruses can be effective in treating cancer, understanding ...
Despite mounting evidence that oncolytic viruses can be effective in treating cancer, understanding ...
Cancer growth and decay can be modeled as a system of chaotic nonlinear differential equations. The ...
Dynamical systems modeling tumor growth have been investigated to determine the dynamics between tum...
The complexity of cancer has motivated the development of different approaches to understand the dyn...
In this paper, we study the bifurcation of a cancer model with completely unknown parameters. The bi...
We study complex oscillations generated by the de Pillis-Radunskaya model of cancer growth, a model ...
Cancer remains a significant burden in HIV-infected individuals. We present an HIV-1 dynamical model...
In this paper, we study the chaos and optimal control of cancer model with completely unknown par...
In this work we are going to investigate the scale formalism in discret mappings. In 1D mappings, we...
In this article, we investigate a tumor-immune and antigen-presenting cells population in the form o...
AbstractA bifurcation analysis is developed for the initial value problem for a nonlinear system of ...
AbstractIn the present note, the chaotic behaviour of a class of infinite system of linear ODEs (wit...
We consider a dynamical model of cancer growth including three interacting cell populations of tumor...
