Maycon de Sousa Araújo scite author profile

Maycon de Sousa Araújo

3Publications

6Citation Statements Received

24Citation Statements Given

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Universidade de São Paulo

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Mean-field approximation for the Sznajd model in complex networks

et al. 2015

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This paper studies the Sznajd model for opinion formation in a population connected through a general network. A master equation describing the time evolution of opinions is presented and solved in a mean-field approximation. Although quite simple, this approximation allows us to capture the most important features regarding the steady states of the model. When spontaneous opinion changes are included, a discontinuous transition from consensus to polarization can be found as the rate of spontaneous change is increased. In this case we show that a hybrid mean-field approach including interactions between second nearest neighbors is necessary to estimate correctly the critical point of the transition. The analytical prediction of the critical point is also compared with numerical simulations in a wide variety of networks, in particular Barabási-Albert networks, finding reasonable agreement despite the strong approximations involved. The same hybrid approach that made it possible to deal with second-order neighbors could just as well be adapted to treat other problems such as epidemic spreading or predator-prey systems.

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Mudança de opinião em redes complexas: aproximação de campo médio para o modelo Sznajd

Araújo¹

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Esta dissertação discutirá, com uma abordagem predominantemente analítica, aspectos em aberto do Modelo Sznajd e de algumas de suas variantes. Apresentaremos uma equação mestra que descreve a evolução de opiniões para o modelo e estudaremos seus estados estacionários numa aproximação de campo médio. Mostraremos que esta simples abordagemé suficientemente para descrever seu comportamento qualitativo. A introdução de ruídoà dinâmica do modelo tambémé analisada. Observa-se, neste caso, a existência de uma transição de fase entre um estado onde há um candidato majoritário (estado ordenado) e um estado onde todas as opiniões coexistem com aproximadamente o mesmo número de eleitores (estado desordenado), dependendo da intensidade desse ruído. Resultados de simulações de Monte Carlo numa rede de Barabási-Albert apresentam boa concordância quando confrontadas com resultados analíticos. Palavras-chaves: opinião, consenso, Modelo Sznajd Complexo, equação mestra, rede de Barabási-Albert.

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Propagação de trincas em meios desordenados submetidos à fadiga induzida por carregamento cíclico

Araújo¹

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