Bifurcation analysis for a regulated logistic growth model

In this paper, we investigate the stability and Hopf bifurcation of a new regulated logistic growth with discrete and distributed delays. By choosing the discrete delay s as a bifurcation parameter, we prove that the system is locally asymptotically stable in a range of the delay and Hopf bifurcatio

Sufficient conditions are established for the global asymptotic stability of the steady state of a regulated logistic growth with variable coefficients in the state feedback of the control modelled by

In this paper we study the Lyapunov stability and Hopf bifurcation in a biological system which models the biological control of parasites of orange plantations.

we provide asymptotic analysis of equilibrium states of a stochastic logistic population model for a single species. The model is based on a stochastic differential equation with a nonlinear diffusion term. Both It.6 and StratonoviE interpretations are considered. We obtain sufficient conditions for

A stepwise logistic regression analysis was performed in 27 cases of papillary carcinoma thyroid (PC), 20 follicular neoplasms (FN), 30 cases of Grave's disease (GD), and 40 cases of colloid adenomatous goitre (CAG). The three most important variables in predicting PC were papillary clusters, dense

We construct the global bifurcation curves, solutions versus level of harvesting, for the steady states of a diffusive logistic equation on a bounded domain, under Dirichlet boundary conditions and other appropriate hypotheses, when a, the linear growth rate of the population, is below λ 2 + δ. Here