Classical solutions to a logistic chemotaxis model with singular sensitivity and signal absorption
Abstract
Assuming that 0<<2n, 0 and μ>n-2n, we prove global existence of classical solutions to a chemotaxis system slightly generalizing \[ split ut &= u - ∇· ( uv ∇ v ) + u -μ u2\\ vt &= v - u v split \] in a bounded domain ⊂ Rn, with homogeneous Neumann boundary conditions and for widely arbitrary positive initial data. In the spatially one-dimensional setting, we prove global existence and, moreover, boundedness of the solution for any >0, μ>0, 0.
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