论文信息 - Boundedness and Lyapunov function for a nonlinear system of hematopoietic stem cell dynamics

Boundedness and Lyapunov function for a nonlinear system of hematopoietic stem cell dynamics

We investigate a system of nonlinear differential equations with distributed delays, arising from a model of hematopoietic stem cell dynamics. We state uniqueness of a global solution under a classical Lipschitz condition. Sufficient conditions for the global stability of the population are obtained, through the analysis of the asymptotic behavior of the trivial steady state and using a Lyapunov function. Finally, we give sufficient conditions for the unbounded proliferation of a given cell generation.

Fabien Crauste | Mostafa Adimy | Abderrahim El Abdllaoui

[1] Laurent Pujo-Menjouet,et al. On the stability of a nonlinear maturity structured model of cellular proliferation , 2004, 0904.2492.

[2] Michael C. Mackey,et al. A new criterion for the global stability of simultaneous cell replication and maturation processes , 1999 .

[3] Jack K. Hale,et al. Introduction to Functional Differential Equations , 1993, Applied Mathematical Sciences.

[4] Fabien Crauste,et al. Global stability of a partial differential equation with distributed delay due to cellular replication , 2003, 0904.2472.

[5] Michael C. Mackey,et al. Unified hypothesis for the origin of aplastic anemia and periodic hematopoiesis , 1978 .

[6] Fabien Crauste,et al. DISCRETE-MATURITY STRUCTURED MODEL OF CELL DIFFERENTIATION WITH APPLICATIONS TO ACUTE MYELOGENOUS LEUKEMIA , 2008 .

[7] F. Crauste,et al. Asymptotic Behavior of a Discrete Maturity Structured System of Hematopoietic Stem Cell Dynamics with Several Delays , 2006 .

[8] Fabien Crauste,et al. A Mathematical Study of the Hematopoiesis Process with Applications to Chronic Myelogenous Leukemia , 2009, SIAM J. Appl. Math..

[9] Michael C. Mackey,et al. Bifurcation and Bistability in a Model of Hematopoietic Regulation , 2007, SIAM J. Appl. Dyn. Syst..