Analysis of a parabolic-hyperbolic hybrid population model

Abstract

This paper is concerned with the global dynamics of a hybrid parabolic-hyperbolic model describing populations with distinct dispersal and sedentary stages. We first establish the global well-posedness of solutions, prove a comparison principle, and demonstrate the asymptotic smoothness of the solution semiflow. Through the spectral analysis of the linearized system, we derive and characterize the net reproductive rate R0. Furthermore, an explicit relationship between R0 and the principal eigenvalue of the linearized system is analyzed. Under appropriate monotonicity assumptions, we show that R0 serves as a threshold parameter that completely determines the stability of steady states of the system. More precisely, when R0<1, the trivial equilibrium is globally asymptotical stable, while when R0>1, the system is uniformly persistent and there is a positive equilibrium which is unique and globally asymptotical stable.