Influence of long-range interactions on strategy selection in crowd

Abstract

An order--disorder phase transition is observed for Ising-like systems even for arbitrarily chosen probabilities of spins flips [K. Malarz et al, Int. J. Mod. Phys. C 22, 719 (2011)]. For such athermal dynamics one must define (z+1) spin flips probabilities w(n), where z is a number of the nearest-neighbours for given regular lattice and n=0,·s,z indicates the number of nearest spins with the same value as the considered spin. Recently, such dynamics has been successfully applied for the simulation of a cooperative and competitive strategy selection by pedestrians in crowd [P. Gawro\'nski et al, Acta Phys. Pol. A 123, 522 (2013)]. For the triangular lattice (z=6) and flips probabilities dependence on a single control parameter x chosen as w(0)=1, w(1)=3x, w(2)=2x, w(3)=x, w(4)=x/2, w(5)=x/4, w(6)=x/6 the ordered phase (where most of pedestrians adopt the same strategy) vanishes for x>xC≈ 0.429. In order to introduce long-range interactions between pedestrians the bonds of triangular lattice are randomly rewired with the probability p. The amount of rewired bonds can be interpreted as the probability of communicating by mobile phones. The critical value of control parameter xC increases monotonically with the number of rewired links M=pzN/2 from xC(p=0)≈ 0.429 to xC(p=1)≈ 0.81.