Bereiche | Tage | Auswahl | Suche | Aktualisierungen | Downloads | Hilfe
DY: Fachverband Dynamik und Statistische Physik
DY 15: Pattern Formation
DY 15.10: Vortrag
Dienstag, 2. April 2019, 12:30–12:45, H3
Pattern formation of a coupled Turing-polarity model — •Francine Kolley1, Peter Groß1, K Vijay Kumar2, and Stephan W Grill1 — 1BIOTEC, TU Dresden, Germany — 2ICTS, Bangalore, India
Pattern formations are ubiquitous phenomena in nature.
It is the ability of non-equilibrium systems to form stable, spatially non-homogeneous states. Such non-equilibrium patterns can emerge via a large class of distinct mechanisms.
Our aim is to couple two different mechanisms, Turing patterns and polarity patterns.
Turing systems are typically described using a diffusion term, which enables to spread out over the space and a reaction term, which couples two different species. These two species can establish Turing patterns under the condition of short-ranged activation and long-ranged inhibition.
In comparison to Turing systems, a central feature of polarity models is mass conservation. As a consequence, the patterned state generally has a singular domain. Furthermore, polarity models can show multistability, where the homogeneous state and the patterned state are both stable to perturbations.
We construct a model that can be gradually shifted from a pure Turing system to a pure polarity system. We investigate the pattern formation properties of this model, with a particular emphasis on the region where the Turing mode and the polarity mode compete.