Cell colonies and branching patterns
Benoît PERTHAME
Lab. J.-L. Lions, UPMC Paris 6
There are very few PDE models undergoing branching instability. Among those, one of the most famous, inspired by dentritic growth of cell populations is known as Mimura's model. It describes the growth of a cell population under the effect of a nutrient which is locally depleted.
We present a conservative parabolic model that undergoes branching instabilities. The swarmers are modeled by a Fokker-Planck type equation à la Keller-Segel, coupled with two fields describing attraction and repulsion. It also includes the 'quorum sensing' limitation proposed by Dolak and Schmeiser.
Several reduced models explain stability and unstability of plateau type traveling wave solutions.
This lecture is based on collaborations with F. Cerreti, Ch. Schmeiser, M. Tang and N. Vauchelet.
IMAGES
Chaîne de gouttes marcheuses (plus de détails...)
CONFÉRENCES
19e Journées de l'Hydrodynamique, Ecole Centrale de Nantes, 26 Novembre 2024
New Challenges in Turbulence Research VII, École de Physique des Houches, 10 Février 2025
New Challenges in Turbulence Research VII, École de Physique des Houches, 10 Février 2025