A delay differential equation model for tumor growth

In this paper, a delayed mathematical model of a nonlinear reaction-diffusion equations modeling the growth of tumors is studied. The establishment of the model is based on the diffusion of nutrient and mass conservation for the two-process proliferation and apoptosis (cell death due to aging). It i

Consider the Dynamic Hopf Bifurcation in delay differential equations where bu(t) is a time delayed feedback control term, b represents the accessible elements, k (k T means a transpose of k) is the control amplitude and is a delayed time. In fact, we will show that a delay in the bifurcation can b

In this paper, criteria on uniform ultimate boundedness are derived for impulsive delay di erential equations using Lyapunov functions and Razumikhin techniques. It should be noted that the boundedness criteria establish global existence of solutions as well as boundedness without assuming, a priori