Your search keyword '"Zhu, Huiyan"' showing total 3 results

1. Global dynamics of a tumor-immune model with an immune checkpoint inhibitor.

Author

He, Fangfang, zhu, Huiyan, Lin, Jinzhang, and Ou, Yingchen

Subjects

*PROGRAMMED cell death 1 receptors, *IMMUNE checkpoint inhibitors, *CELL populations, *CELL death, *T cells, *PROGRAMMED death-ligand 1

Abstract

In this paper, a mathematical ordinary differential tumor-immune model is proposed based on an immune checkpoint inhibitor, which is an innovative method for tumor immunotherapies. Two important factors in tumor-immune response are the programmed cell death protein 1 (PD-1) and its ligand PD-L1. The model consists of three populations: tumor cells, activated T cells and anti-PD-1. By analyzing the dynamics of the model, it is found that there is always a unique tumor-free equilibrium and at most two tumor interior equilibria. The nonexistence of nontrivial positive periodic orbits is established by using the new Dulac function, and then a global dynamics of the model is obtained. The conclusions of our analysis show that increasing the possibility of T cells killing tumor cells (p), early detection of tumor cells, or the use of PD-1 inhibitors to activate T cells are effective in eliminating tumor cells. [ABSTRACT FROM AUTHOR]

Published

2024

2. Dynamics on tumor immunotherapy model with periodic impulsive infusion.

Author

Zhu, Huiyan, Ding, Qian, Wang, Fangjuan, and Wang, Huilan

Subjects

*CANCER immunotherapy, *DIFFERENTIAL equations, *ORDINARY differential equations, *MATHEMATICAL models, *IMPULSIVE differential equations

Abstract

A periodic pulse differential equation model of tumor immunotherapy is established by considering the periodic and transient behavior of infusing immune cells. Using comparison theorem and Floquet multiplier theory of the impulsive differential equation, the boundedness of the model solution, the existence and stability of the free-tumor periodic solution are given. Furthermore, the persistence of the system is analyzed. Numerical simulations are carried to confirm the main theorems. [ABSTRACT FROM AUTHOR]

Published

2016

3. Traveling wavefronts of a nonlinear reaction-diffusion model of tumor growth under the acid environment.

Author

Zhu, Huiyan, Luo, Yang, and Wang, Xiufang

Subjects

*WAVEFRONTS (Optics), *REACTION-diffusion equations, *TUMOR growth, *FREDHOLM equations, *FIXED point theory

Abstract

In this paper, a reaction-diffusion model describing temporal development of tumor tissue, normal tissue and excess H+ ion concentration is considered. Based on a combination of perturbation methods, the Fredholm theory and Banach fixed point theorem, we theoretically justify the existence of the traveling wave solution for this model. [ABSTRACT FROM AUTHOR]

Published

2014