Regensburg 2019 – scientific programme
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DY: Fachverband Dynamik und Statistische Physik
DY 26: Active matter I (joint session BP/CPP/DY)
DY 26.10: Talk
Wednesday, April 3, 2019, 12:15–12:30, H4
Phase space geometry of reaction--diffusion systems — •Fridtjof Brauns, Jacob Halatek, and Erwin Frey — Arnold Sommerfeld Center for Theoret- ical Physics, Ludwig-Maximilians-Universität München, Germany
Self-organized pattern formation --- typically studied in terms of spatially extended dynamical systems --- is as ubiquitous in nature as it is difficult to deal with conceptually and mathematically. We build on the phase space geometric methods of Nonlinear Dynamics, using geometric structures like nullclines and fixed points, to develop a comprehensive theory for two-component mass-conserving reaction--diffusion systems --- a paradigmatic model class for pattern formation, e.g. intracellular polarization. A dissection of space into (notional) compartments enables us to characterize the spatio-temporal dynamics based on the ODE phase space of local reactions. Diffusive coupling leads to mass redistribution between the compartments which, in turn, changes the local phase space properties.
We show that all aspects of pattern formation, from linear instability and excitability to the bifurcations of stationary patterns, can be extracted from the geometric features of the line of chemical equilibria in phase space. Furthermore, our analysis points towards a deep connection between the far from equilibrium reaction--diffusion dynamics to phase separation of binary mixtures near equilibrium, and thus offers a new perspective on phase separation far from equilibrium.