Global boundedness and finite time blow-up of solutions for a quasilinear chemotaxis-May-Nowak model
Abstract
In this paper, we introduce the nonlinear diffusion term ∇·(D(u)∇ u) into the chemotaxis-May-Nowak model to investigate the effects of D(u) and chemotaxis on the global existence, boundedness, and finite time blow-up of solutions. Here, D(u) generalizes the prototype (1+u)m-1 with m∈. For the parabolic-elliptic-parabolic case, if m>2+n2-2n when n3 and m>32 when n=2, then all solutions exist globally and remain bounded, whereas if n∈\2,3\ and m<1, finite time blow-up occurs when is a ball and the initial data are radially symmetric. For the fully parabolic case, if m>1+n2-2n, then all solutions exist globally and remain bounded.
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