Pinning-depinning transition in a stochastic growth model for the evolution of cell colony fronts in a disordered media

NARA GUISONI; EZEQUIEL V. ALBANO; BELÉN MOGLIA

PHYSICAL REVIEW E - STATISTICAL PHYSICS, PLASMAS, FLUIDS AND RELATED INTERDISCIPLINARY TOPICS

American Physical Society

Año: 2016

1063-651X

We study a stochastic lattice model for cell colony growth, which takes into account proliferation, diffusion, and rotation of cells, in a culture medium with quenched disorder. The medium is composed both by sites that inhibit any possible change in the internal state of the cells, representing the disorder, as well as by active medium sites, that do not interfere with the cell dynamics. By means of Monte Carlo simulations we find that the velocity of the growing interface, which is taken as the order parameter of the model, strongly depends on the density of active medium sites ($ho_A$). In fact, the model presents a (continuous) second-order pinning-depinning transition at a certain critical value of $ho_A^{crit}$, such as for $ho_A>ho_A^{crit}$ the interface moves freely across the disordered medium, but for $ho_A