Extinction, decay and blow-up for Keller-Segel systems of fast diffusion type

We consider the quasi-linear Keller-Segel system of singular type, where the principal part Δum represents a fast diffusion like 0<m<1. We first construct a global weak solution with small initial data in the scaling invariant norm for all dimensions N?2 and all exponents q?2. As for the large initial data, we show that there exists a blow-up solution in the case of N=2. In the second part, the decay property in Lr with 1<r<∞ for with the mass conservation is shown. On the other hand, in the case of , the extinction phenomenon of solution is proved. It is clarified that the case of exhibits the borderline in the sense that the decay and extinction occur when the diffusion power m changes across . For the borderline case of , our solution decays in Lr exponentially as t→∞.