Finite-time blowup in a parabolic-parabolic-elliptic chemotaxis model involving indirect signal production

Abstract

This paper is concerned with a three-component chemotaxis model accounting for indirect signal production,reading as ut = ∇·(∇ u - u∇ v),vt = v - v + w and 0 = w - w + u,posed in a ball of Rn with n≥5,subject to homogeneous Neumann boundary conditions.The system is a Nagai-type variant of its fully parabolic version that has a four-dimensional critical mass phenomenon concerning blowup in finite or infinite time according to the seminal works of Fujie and Senba [J. Differential Equations, 263 (2017), 88--148; 266 (2019), 942--976].We prove that for any prescribed mass m > 0, there exist radially symmetric and positive initial data (u0,v0)∈ C0()× C2() with ∫ u0 = m such that the corresponding solutions blow up in finite time.

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