A general continuous-state nonlinear branching process

Abstract

In this paper we consider the unique nonnegative solution to the following generalized version of the stochastic differential equation for a continuous-state branching process. Xt = x+∫0tγ0(Xs) s+∫0t∫0γ1(Xs-) W( s, u) +∫0t∫0∞∫0γ2(Xs-) zN( s, z, u), where W( t, u) and N( s, z, u) denote a Gaussian white noise and an independent compensated spectrally positive Poisson random measure, respectively, and γ0,γ1 and γ2 are functions on R+ with both γ1 and γ2 taking nonnegative values. Intuitively, this process can be identified as a continuous-state branching process with population-size-dependent branching rates and with competition. Using martingale techniques we find rather sharp conditions on extinction, explosion and coming down from infinity behaviors of the process. Some Foster-Lyapunov type criteria are also developed for such a process. More explicit results are obtained when γi, i=0, 1, 2 are power functions.