Global existence, boundedness and stabilization in a high-dimensional chemotaxis system with consumption

Abstract

This paper deals with the homogeneous Neumann boundary-value problem for the chemotaxis-consumption system eqnarray* arrayllc ut= u-∇· (u∇ v)+ u-μ u2,\\ vt= v-uv, array eqnarray* in N-dimensional bounded smooth domains for suitably regular positive initial data. We shall establish the existence of a global bounded classical solution for suitably large μ and prove that for any μ>0 there exists a weak solution. Moreover, in the case of >0 convergence to the constant equilibrium (μ,0) is shown.