Analysis of a chemotaxis model with indirect signal absorption

Abstract

We consider the chemotaxis model align* cases ut = u - ∇ · (u ∇ v), \\ vt = v - vw, \\ wt = -δ w + u cases align* in smooth, bounded domains ⊂ Rn, n ∈ N, where δ 0 is a given parameter. If either n 2 or \|v0\|L∞() 13n we show the existence of a unique global classical solution (u, v, w) and convergence of (u(·, t), v(·, t), w(·, t)) towards a spatially constant equilibrium, as t ∞. The proof of global existence for the case n 2 relies on a bootstrap procedure. As a starting point we derive a functional inequality for a functional being sublinear in u, which appears to be novel in this context.