Suppression of chemotactic blowup by strong buoyancy in Stokes-Boussinesq flow with cold boundary

Authors

Hu, Z; Kiselev, A

Abstract

In this paper, we show that the Keller-Segel equation equipped with zero Dirichlet Boundary condition and actively coupled to a Stokes-Boussinesq flow is globally well-posed provided that the coupling is sufficiently large. We will in fact show that the dynamics is quenched after certain time. In particular, such active coupling is blowup-suppressing in the sense that it enforces global regularity for some initial data leading to a finite-time singularity when the flow is absent.

Citation

Hu, Z., and A. Kiselev. “Suppression of chemotactic blowup by strong buoyancy in Stokes-Boussinesq flow with cold boundary.” Journal of Functional Analysis 287, no. 7 (October 1, 2024). https://doi.org/10.1016/j.jfa.2024.110541.
Journal of Functional Analysis

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