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DY: Fachverband Dynamik und Statistische Physik
DY 29: Statistical Physics of Biological Systems - Part II (joint session BP/DY/CPP)
DY 29.8: Vortrag
Mittwoch, 18. März 2015, 12:00–12:15, H 1028
Stochastic dynamics of adhesion bonds for a rod propelled by both force and torque — •Anna Battista and Ulrich Schwarz — Heidelberg University, Heidelberg, Germany
The stochastic dynamics of adhesion bonds has emerged as a powerful theoretical framework to explain many prominent features of sliding friction, including the stick-slip regimes often observed at intermediate driving velocity. Sliding friction occurs in a variety of physical contexts, ranging from tribology to cell motility. In particular, stochastic bonds have been employed to model the dynamics of adhesion between a cell and its substrate. Although much progress has been achieved with the help of stochastic bond models, up to now they have been restricted to sliding friction in one dimension. However, there are situations in which translation is coupled with rotation, as is the case of gliding cells with a shape asymmetry. Motivated by this observation, we develop a sliding friction model for a slider that is both translated and rotated, while being connected to the substrate by stochastic bonds. We find that torque enhances the tendency for stick-slip behaviour and that adhesive patches spontaneously form at the moving interface when the on-rate of the bonds has a velocity dependence. Interestingly, our results show an adhesion dynamics reminiscent of that observed during the migration of curved malaria parasites.