A critical nonlinearity for blow-up in a higher-dimensional chemotaxis system with indirect signal production

Abstract

The Neumann problem in balls ⊂Rn, n∈\3,4\, for the chemotaxis system equation* \ arrayll ut = u - ∇ · (u∇ v), \\[1mm] 0 = v - μ(w)(t) + w, μ(w)(t) = 1||∫ w \\[1mm] wt = w - w + f(u), array . equation* is considered. Under the assumption that f∈ C1([0,∞)) is such that f() kσ for all 0 and some k>0 and σ>4n, it is shown that finite-time blow-up occurs for some radially symmetric solutions.

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