Finite time blow-up in a parabolic-elliptic Keller-Segel system with nonlinear diffusion and signal-dependent sensitivity

Abstract

This paper is concerned with the parabolic-elliptic Keller-Segel system with nonlinear diffusion and signal-dependent sensitivity alignKSsystem cases ut=(u+1)m-∇·(u(v)∇ v), &x∈, t>0,\\ 0= v-v+u, &x∈, t>0 cases align under homogeneous Newmann boundary conditions and initial conditions, where =BR(0)⊂RN (N≥3,\ R>0) is a ball, m≥ 1, is a function satisfying that (s)≥0(a+s)-k (k>0, 0>0, a≥ 0) for all s>0 and some conditions. If the case that m=1 and (s)=0s-k, Nagai-Senba established finite-time blow-up of solutions under the smallness conditions on a moment of initial data u(x, 0) and some condition for k∈(0,1). Moreover, if the case that (s)(const.), Sugiyama showed finite-time blow-up of solutions under the condition m∈[1,2-2N). According to two previous works, it seems that the smallness conditions of m and k leads to finite-time blow-up of solutions. The purpose of this paper is to give the relationship which depends only on m, k and N such that there exists initial data which corresponds finite-time blow-up solutions.