Possible points of blow-up in chemotaxis systems with spatially heterogeneous logistic source

Abstract

We discuss the influence of possible spatial inhomogeneities in the coefficients of logistic source terms in parabolic-elliptic chemotaxis-growth systems of the form align* ut &= u - ∇·(u∇ v) + (x)u-μ(x)u2, 0 &= v - v + u align* in smoothly bounded domains ⊂R2. Assuming that the coefficient functions satisfy ,μ∈ C0() with μ≥0 we prove that finite-time blow-up of the classical solution can only occur in points where μ is zero, i.e.\ that the blow-up set B is contained in align* \x∈μ(x)=0\. align* Moreover, we show that whenever μ(x0)>0 for some x0∈, then one can find an open neighbourhood U of x0 in such that u remains bounded in U throughout evolution.