Weak global solvability of a doubly degenerate parabolic-elliptic nutrient taxis system

Abstract

This work studies the following doubly degenerate parabolic-elliptic nutrient taxis system cases ut = (uvux)x -(u2 vvx)x + uv, \\[1.5 ex] 0.2 cm0 = vxx - uv + f(x,t), cases in a bounded interval ⊂ R, under no-flux boundary conditions and nonnegative initial value u(x,0) = u0(x) ≥ 0, where f(x,t) ≥ 0 is known external supply of the nutrient. It is shown that for any nonnegative u0 ∈ W1,∞() and f ∈ C1( × [0,∞) ), f 0, a global weak solution of the problem can be constructed by means of a regularization approach. The core of the analysis lies on a Harnack-type inequality for the second that allows us to overcome the lack of uniform coercivity. Together with time regularity properties, we obtain relative compactness through a combination of the Arzel\`a-Ascoli theorem and the Aubin-Lions lemma.