Stabilization of arbitrary structures in a three-dimensional doubly degenerate nutrient taxis system

Abstract

The doubly degenerate nutrient taxis system equation 0.1 \ aligned &ut=∇ · (uv∇ u)- ∇ · (uαv∇ v)+ uv,&x∈ ,\, t>0,\\ & vt= v-uv,&x∈ ,\, t>0,\\ aligned . equation is considered under zero-flux boundary conditions in a smoothly bounded domain ⊂R3 where α>0,>0 and > 0. By developing a novel class of functional inequalities to address the challenges posed by the doubly degenerate diffusion mechanism in 0.1, it is shown that for α∈(32,1912), the associated initial-boundary value problem admits a global continuous weak solution for sufficiently regular initial data. Furthermore, in an appropriate topological setting, this solution converges to an equilibrium (u∞, 0) as t→ ∞. Notably, the limiting profile u∞ is non-homogeneous when the initial signal concentration v0 is sufficiently small, provided the initial data u0 is not identically constant.