Phase transitions and universality in the Sznajd model with anticonformity
In this work we study the dynamics of opinion formation in the Sznajd model with anticonformity on regular lattices in two and three dimensions. The anticonformity behavior is similar to the introduction of Galam's contrarians in the population. The model was previously studied in fully-connect...
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| creator | Calvelli, Matheus Crokidakis, Nuno Penna, Thadeu J P |
| description | In this work we study the dynamics of opinion formation in the Sznajd model with anticonformity on regular lattices in two and three dimensions. The anticonformity behavior is similar to the introduction of Galam's contrarians in the population. The model was previously studied in fully-connected networks, and it was found an order-disorder transition with the order parameter exponent \(\beta=1/2\) calculated analytically. However, the other phase transition exponents were not estimated, and no discussion about the possible universality of the phase transition was done. Our target in this work is to estimate numerically the other exponents \(\gamma\) and \(\nu\) for the fully-connected case, as well as the three exponents for the model defined in square and cubic lattices. Our results suggest that the model belongs to the Ising model universality class in the respective dimensions. |
| doi_str_mv | 10.48550/arxiv.1809.01630 |
| format | Article |
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The anticonformity behavior is similar to the introduction of Galam's contrarians in the population. The model was previously studied in fully-connected networks, and it was found an order-disorder transition with the order parameter exponent \(\beta=1/2\) calculated analytically. However, the other phase transition exponents were not estimated, and no discussion about the possible universality of the phase transition was done. Our target in this work is to estimate numerically the other exponents \(\gamma\) and \(\nu\) for the fully-connected case, as well as the three exponents for the model defined in square and cubic lattices. 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| subjects | Exponents Ising model Lattices (mathematics) Mathematical models Order parameters Order-disorder transformations Phase transitions Physics - Physics and Society Physics - Statistical Mechanics Three dimensional models Transportation networks |
| title | Phase transitions and universality in the Sznajd model with anticonformity |
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