A dimension-independent critical exponent in a nutrient taxis system

Abstract

In a ball ⊂ Rn with arbitrary n 1, the chemotaxis-consumption system \[ \ arrayl ut = ∇ · (D(u)∇ u) - ∇ · (u∇ v), \\[1mm] 0 = v - uv, array . \] is considered under no-flux boundary conditions for u, and for prescribed constant positive boundary data for v. Under the assumption that D∈ C3([0,∞)) satisfies \[ D() kD (+1)-α for all 0 () \] with some α<1 and some kD>0, it is shown that for each nonnegative and radially symmetric u0∈ q>\2,n\ W1,q(), a uniquely determined global bounded classical solution exists. This complements a previous result according to which given any positive D∈ C3([0,∞)) fulfilling D() KD (+1)-α with some α>1 and KD>0, one can find nonnegative radial initial data u0∈ C0∞() such that no global solution exists.