A switch in dimension dependence of critical blow-up exponents in a Keller-Segel system involving indirect signal production
Abstract
In bounded n-dimensional domains with n 3, this manuscript considers an initial-boundary problem for a quasilinear chemotaxis system with indirect attractant production, as arising, inter alia, in the modeling of effects due to phenotypical heterogeneity in microbial populations. Under the assumption that the rates D and S of diffusion and cross-diffusion are suitably regular functions of the population density, essentially exhibiting asymptotic behavior of the form \[ D() m-1 and S() σ, ∞, \] the identity \[ σ=m-1+4n (n 3), \] is shown to determine a critical line for the occurrence of blow-up. This considerably differs from low-dimensional cases, in which the relation \[ σ=m+2n (n 2) \] is known to play a correspondingly pivotal role.
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