Strong convergence of weighted gradients in parabolic equations and applications to global generalized solvability of cross-diffusive systems

Abstract

In the first part of the present paper, we show that strong convergence of (v0 ) ∈ (0, 1) in L1() and weak convergence of (f) ∈ (0, 1) in Lloc1( × [0, ∞)) not only suffice to conclude that solutions to the initial boundary value problem align* cases v t = v + f(x, t) & in × (0, ∞), \\ ∂ v = 0 & on ∂ × (0, ∞), \\ v(·, 0) = v0 & in , cases align* which we consider in smooth, bounded domains , converge to the unique weak solution of the limit problem, but that also certain weighted gradients of v converge strongly in Lloc2( × [0, ∞)) along a subsequence. We then make use of these findings to obtain global generalized solutions to various cross-diffusive systems. Inter alia, we establish global generalized solvability of the system align* cases ut = u - ∇ · (uv ∇ v) + g(u), \\ vt = v - uv, cases align* where > 0 and g ∈ C1([0, ∞)) are given, merely provided that (g(0) ≥ 0 and) -g grows superlinearily. This result holds in all space dimensions and does neither require any symmetry assumptions nor the smallness of certain parameters. Thereby, we expand on a corresponding result for quadratically growing -g proved by Lankeit and Lankeit (Nonlinearity, 32(5):1569--1596, 2019).