Uniqueness and convergence on equilibria of the Keller-Segel system with subcritical mass

Abstract

This paper is concerned with the uniqueness of solutions to the following nonlocal semi-linear elliptic equation equationellip u-β u+λeu∫eu=0~in~, equation where is a bounded domain in R2 and β, λ are positive parameters. The above equation arises as the stationary problem of the well-known classical Keller-Segel model describing chemotaxis. For equation ellip with Neumann boundary condition, we establish an integral inequality and prove that the solution of (ellip) is unique if 0<λ ≤ 8π and u satisfies some symmetric properties. While for ellip with Dirichlet boundary condition, the same uniqueness result is obtained without symmetric condition by a different approach inspired by some recent works [19,21]. As an application of the uniqueness results, we prove that the radially symmetric solution of the classical Keller-Segel system with subcritical mass subject to Neumann boundary conditions will converge to the unique constant equilibrium as time tends to infinity if is a disc in two dimensions. As far as we know, this is the first result that asserts the exact asymptotic behavior of solutions to the classical Keller-Segel system with subcritical mass in two dimensions.