Boundedness enforced by mildly saturated conversion in a chemotaxis-May-Nowak model for virus infection

Abstract

We study the system align* prob:star cases ut = u - ∇ · (u ∇ v) - u - f(u) w + , \\ vt = v - v + f(u) w, \\ wt = w - w + v, cases align* which models the virus dynamics in an early stage of an HIV infection, in a smooth, bounded domain ⊂ Rn, n ∈ N, for a parameter 0 and a given function f ∈ C1([0, ∞)) satisfying f 0, f(0) = 0 and f(s) Kf sα for all s 1, some Kf 0 and α ∈ R. We prove that whenever align* α 2n, align* solutions to prob:star exist globally and are bounded. The proof mainly relies on smoothing estimates for the Neumann heat semigroup and (in the case α 1) on a functional inequality. Furthermore, we provide some indication why the exponent 2n could be essentially optimal.