Chemotaxis models with signal-dependent sensitivity and a logistic-type source, II: Persistence and stabilization

Abstract

This paper is Part II of a series on global existence and asymptotic behavior of positive solutions to equation* cases ut= u-0∇·(um(1+v)β∇ v)+au-bu1+α, & x∈, 0= v-μ v+ uγ, & x∈, ∂ u∂ n=∂ v∂ n=0, & x∈∂, cases equation* where ⊂RN is a bounded and smooth domain. The parameters α,γ,m,μ, are positive, 0 is real, and a,b,β are nonnegative. In Part I, we established boundedness and global existence. Here, we study persistence and stabilization, quantifying how β and 0 influence long-time dynamics. First, we prove uniform persistence if m 1. Next, for a,b>0, the unique positive equilibrium is (u*,v*) = ((ab)1/α,(μ)(ab)γ/α). We identify a threshold *(u*): (u*,v*) is linearly stable if 0<*(u*), with local exponential decay, unstable if 0>*(u*). We also give conditions ensuring every bounded solution converges exponentially to (u*,v*). For a=b=0, we study stability of the constant equilibria under mass constraint, obtaining a linear stability threshold and global stabilization. We extend the Lyapunov method from m=1 to m>1 and the rectangle/ODE method from β=0 to β>0. For m 1, signal saturation (large β) or repulsion (0<0) prevents aggregation and promotes relaxation. In Part III, we study bifurcation and pattern formation when 0 passes through critical thresholds.