Locally bounded global solutions to a chemotaxis consumption model with singular sensitivity and nonlinear diffusion
Abstract
We show the existence of locally bounded global solutions to the chemotaxis system \[ ut = ∇·(D(u)∇ u) - ∇·(uv ∇ v) \] \[ vt = v - uv \] with homogeneous Neumann boundary conditions and suitably regular positive initial data in smooth bounded domains ⊂ RN, N≥2, for D(u)≥ δ um-1 with some δ>0, provided that m>1+ N4.
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