Boundedness in a two-dimensional chemotaxis-haptotaxis system

Abstract

This work studies the chemotaxis-haptotaxis system \ arrayll ut= u - ∇ · (u∇ v) - ∇ · (u∇ w) + μ u(1-u-w), & x∈ , \, t>0, \\[1mm] vt= v-v+u, & x∈ , \, t>0, \\[1mm] wt=-vw, & x∈ , \, t>0, array . in a bounded smooth domain ⊂R2 with zero-flux boundary conditions, where the parameters , and μ are assumed to be positive. It is shown that under appropriate regularity assumption on the initial data (u0, v0, w0), the corresponding initial-boundary problem possesses a unique classical solution which is global in time and bounded. In addition to coupled estimate techniques, a novel ingredient in the proof is to establish a one-sided pointwise estimate, which connects w to v and thereby enables us to derive useful energy-type inequalities that bypass w. However, we note that the approach developed in this paper seems to be confined to the two-dimensional setting.