Boundedness criteria for a chemotaxis consumption model with gradient nonlinearities

Abstract

This work deals with the consumption chemotaxis problem equation* cases* ut = u - ∇ · u∇ v + λ u - μ u2 - c ∇ u γ, & in ×(0,), vt = v - uv, & in ×(0,), cases* equation* in a bounded and smooth domain ⊂n, n≥ 3, under Neumann boundary conditions, for ,λ,μ,c>0, ∈(0,∞] and for u0,v0 positive initial data with a certain regularity. We will show that the problem has a unique and uniformly bounded classical solution for γ∈(2nn+1,2]. Moreover, we have the same result for γ=2nn+1 and a condition that involves the parameters c,μ,n, and the initial data.