Abstract: | In this paper, we study the attraction‐repulsion chemotaxis system with logistic source: ut = Δu?χ?·(u?v)+ξ?·(u?w)+f(u), 0 = Δv?βv+αu, 0 = Δw?δw+γu, subject to homogeneous Neumann boundary conditions in a bounded and smooth domain , where χ,α,ξ,γ,β, and δ are positive constants, and is a smooth function satisfying f(s) ≤ a?bs3/2 for all s ≥ 0 with a ≥ 0 and b > 0. It is proved that when the repulsion cancels the attraction (ie, ξγ=χα), for any nonnegative initial data , the solution is globally bounded. This result corresponds to the one in the classical 2‐dimensional Keller‐Segel model with logistic source bearing quadric growth restrictions. |