We consider a compromise model in one dimension in which pairs of agents interact through first-order dynamics that involve both attraction and repulsion. In the case of all-to-all coupling of agents, this system has a lowest energy state in which half of the agents agree upon one value and the other half agree upon a different value. The purpose of this paper is to study the behavior of this compromise model when the interaction between the N agents occurs according to an Erdo{double acute}s-Rényi random graph G(N,p). We study the effect of changing p on the stability of the compromised state, and derive both rigorous and asymptotic results suggesting that the stability is preserved for probabilities greater than p_c=O(log N/N). In other words, relatively few interactions are needed to preserve stability of the state. The results rely on basic probability arguments and the theory of eigenvalues of random matrices.
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机译:我们在一个维度上考虑一种折衷模型,在该模型中,代理对通过涉及吸引和排斥的一阶动力学相互作用。在全部到全部的试剂耦合的情况下,该系统具有最低能量状态,其中一半的试剂同意一个值,另一半的试剂同意不同的值。本文的目的是根据Erdo {double急性}s-Rényi随机图G(N,p)研究当N个代理之间发生相互作用时此折衷模型的行为。我们研究了改变p对折衷状态的稳定性的影响,并得出了严格的和渐近的结果,表明对于大于p_c = O(log N / N)的概率,稳定性得以保留。换句话说,需要很少的交互来保持状态的稳定性。结果依赖于基本概率论和随机矩阵的特征值理论。
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