It was shown that it can display discontinuous phase transitions for \(q_c \ge q_a + \Delta q\), where \(\Delta q=4\) for \(q_a \le 3\) and \(\Delta q=3\) for \(q_a>3\). Previously, such a generalized model was studied only on the complete graph, which corresponds to the mean-field approach. For \(q_c=q_a=q\) the model reduces to the original q-voter model with anticonformity. In such a model, two types of social responses, conformity and anticonformity, occur with complementary probabilities and the size of the source of influence \(q_c\) in case of conformity is independent from the size of the source of influence \(q_a\) in case of anticonformity. We study the binary q-voter model with generalized anticonformity on random Erdős–Rényi graphs.
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