Abstract
We introduce a generalized version of the noisy q-voter model, one of the most popular opinion dynamics models, in which voters can be in one of s ge 2 states. As in the original binary q-voter model, which corresponds to s=2, at each update randomly selected voter can conform to its q randomly chosen neighbors only if they are all in the same state. Additionally, a voter can act independently, taking a randomly chosen state, which introduces disorder to the system. We consider two types of disorder: (1) annealed, which means that each voter can act independently with probability p and with complementary probability 1-p conform to others, and (2) quenched, which means that there is a fraction p of all voters, which are permanently independent and the rest of them are conformists. We analyze the model on the complete graph analytically and via Monte Carlo simulations. We show that for the number of states s>2 the model displays discontinuous phase transitions for any q>1, on contrary to the model with binary opinions, in which discontinuous phase transitions are observed only for q>5. Moreover, unlike the case of s=2, for s>2 discontinuous phase transitions survive under the quenched disorder, although they are less sharp than under the annealed one.
Highlights
We introduce a generalized version of the noisy q-voter model, one of the most popular opinion dynamics models, in which voters can be in one of s ≥ 2 states
Because hysteresis cannot appear within the continuous phase transition, researchers working in the field of opinion dynamics try to determine conditions under which discontinuous phase transitions appear[6,7,8,9,10,11,12,13,14]
In this paper we propose a generalization of the original binary q-voter model with independence[6], known as the noisy nonlinear v oter[36] or the noisy q-voter model[37]
Summary
We introduce a generalized version of the noisy q-voter model, one of the most popular opinion dynamics models, in which voters can be in one of s ≥ 2 states. In this paper we focus on two factors that are known to influence the type of transition, namely the type of disorder (quenched vs annealed) and the number of states It is known, that discontinuous phase transitions can be rounded (become less sharp) or even totally forbidden in the presence of the quenched d isorder[15,16,17,18]. In this paper we introduce the generalized version of the noisy q-voter model, in which each agent can be in one of several discrete states, as it was done already for the linear voter[23,24,25,26,27,28], majority-vote[21,22,29,30,31,32] or other models of opinion d ynamics[33,34]. Each agent i is described by a dynamical
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