Nonlinear q-voter model.

We introduce a nonlinear variant of the voter model, the q-voter model, in which q neighbors (with possible repetition) are consulted for a voter to change opinion. If the q neighbors agree, the voter takes their opinion; if they do not have a unanimous opinion, still a voter can flip its state with probability epsilon . We solve the model on a fully connected network (i.e., in mean field) and compute the exit probability as well as the average time to reach consensus by employing the backward Fokker-Planck formalism and scaling arguments. We analyze the results in the perspective of a recently proposed Langevin equation aimed at describing generic phase transitions in systems with two ( Z2-symmetric) absorbing states. In particular, by deriving explicitly the coefficients of such a Langevin equation as a function of the microscopic flipping probabilities, we find that in mean field the q-voter model exhibits a disordered phase for high epsilon and an ordered one for low epsilon with three possible ways to go from one to the other: (i) a unique (generalized-voter-like) transition, (ii) a series of two consecutive transitions, one (Ising-like) in which the Z2 symmetry is broken and a separate one (in the directed-percolation class) in which the system falls into an absorbing state, and (iii) a series of two transitions, including an intermediate regime in which the final state depends on initial conditions. This third (so far unexplored) scenario, in which a type of ordering dynamics emerges, is rationalized and found to be specific of mean field, i.e., fluctuations are explicitly shown to wash it out in spatially extended systems.

[1]  Irene A. Stegun,et al.  Handbook of Mathematical Functions. , 1966 .

[2]  M. Kimura,et al.  An introduction to population genetics theory , 1971 .

[3]  P. Clifford,et al.  A model for spatial conflict , 1973 .

[4]  P. Hohenberg,et al.  Theory of Dynamic Critical Phenomena , 1977 .

[5]  C. Gardiner Handbook of Stochastic Methods , 1983 .

[6]  M. J. Oliveira,et al.  Nonequilibrium spin models with Ising universal behaviour , 1993 .

[7]  A. Bray Theory of phase-ordering kinetics , 1994, cond-mat/9501089.

[8]  Krapivsky,et al.  Exact results for kinetics of catalytic reactions. , 1996, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[9]  C Godreche,et al.  Phase ordering and persistence in a class of stochastic processes interpolating between the Ising and voter models , 1999 .

[10]  J. Dushoff,et al.  Local frequency dependence and global coexistence. , 1999, Theoretical population biology.

[11]  Katarzyna Sznajd-Weron,et al.  Opinion evolution in closed community , 2000, cond-mat/0101130.

[12]  H. Hinrichsen,et al.  Critical coarsening without surface tension: the universality class of the voter model. , 2001, Physical review letters.

[13]  F. Slanina,et al.  Analytical results for the Sznajd model of opinion formation , 2003, cond-mat/0305102.

[14]  Adam Lipowski,et al.  Splitting the voter Potts model critical point. , 2003, Physical review. E, Statistical, nonlinear, and soft matter physics.

[15]  S. Redner,et al.  Dynamics of majority rule in two-state interacting spin systems. , 2003, Physical review letters.

[16]  S. Redner,et al.  Voter model on heterogeneous graphs. , 2004, Physical review letters.

[17]  M. A. Muñoz,et al.  Langevin description of critical phenomena with two symmetric absorbing states. , 2004, Physical review letters.

[18]  Serge Galam,et al.  Local dynamics vs. social mechanisms: A unifying frame , 2005 .

[19]  Maxi San Miguel,et al.  Ordering dynamics with two non-excluding options: bilingualism in language competition , 2006, physics/0609079.

[20]  Vittorio Loreto,et al.  Topology Induced Coarsening in Language Games , 2005, Physical review. E, Statistical, nonlinear, and soft matter physics.

[21]  S Redner,et al.  Evolutionary dynamics on degree-heterogeneous graphs. , 2006, Physical review letters.

[22]  Luca Dall'Asta,et al.  Effective surface-tension in the noise-reduced voter model , 2006, cond-mat/0612186.

[23]  S. Redner,et al.  Dynamics of non-conservative voters , 2007, 0712.0364.

[24]  S. Redner,et al.  Voter models on heterogeneous networks. , 2007, Physical review. E, Statistical, nonlinear, and soft matter physics.

[25]  Cristóbal López,et al.  Systems with two symmetric absorbing states: relating the microscopic dynamics with the macroscopic behavior. , 2008, Physical review. E, Statistical, nonlinear, and soft matter physics.

[26]  F. Schweitzer,et al.  Nonlinear voter models: the transition from invasion to coexistence , 2003, cond-mat/0307742.

[27]  S. Fortunato,et al.  Statistical physics of social dynamics , 2007, 0710.3256.