An interpolation inequality and its application in Keller-Segel model

Abstract

In this paper, we first prove an interpolation inequality of Ehrling-type, which is an improvement of a special case to the well known Gargliardo-Nirenberg inequality. Then we apply it to study the classical Keller-Segel system equation \ arrayllc ut= u-∇·(u ∇ v), \\[6pt] vt= v-v+u, array . equation in a bounded domain ⊂RN (N 2) with smooth boundary. It is known that for any δ>0, if ∫ u N2+δ(·,t) is bounded, then the solution is global and bounded. Here we show that the same conclusion holds for a weaker assumption: the equi-integrability of \∫ u N2(·,t)|~t∈(0,T)\ can prevent blow up.