An improvement toward global boundedness in a fully parabolic chemotaxis with singular sensitivity in any dimension

Abstract

This paper deals with the problem of global solvability and boundedness of classical solutions to a fully parabolic chemotaxis system with singular sensitivity in any dimensional setting. In particular, We show that the system equation* cases ut = u - ∇ · ( uv ∇ v ), \\ vt = v - v + u, cases equation* posed in a bounded domain ⊂ Rn with n ≥ 3, admits a global bounded classical solution provided that ∈ (0,0) with 0 > 2n can be determined explicitly. This result extends several existing works, which established global boundedness under the more restrictive condition < 2n, and shows that this threshold is not an optimal upper bound for preventing blow-up.