Distributed voting is a fundamental topic in distributed computing. In pull voting, in each step every vertex chooses a neighbour uniformly at random, and adopts its opinion. The voting is completed when all vertices hold the same opinion. On many graph classes including regular graphs, pull voting requires Ω(n) expected steps to complete, even if initially there are only two distinct opinions. In this paper we consider a related process which we call two-sample voting: every vertex chooses two random neighbours in each step. If the opinions of these neighbours coincide, then the vertex revises its opinion according to the chosen sample. Otherwise, it keeps its own opinion. We consider the performance of this process in the case where two different opinions reside on vertices of some (arbitrary) sets A and B, respectively. Here, |A| + |B|= n is the number of vertices of the graph. We show that there is a constant K such that if the initial imbalance between the two opinions is ν_o = (|A| - |B|) ≥ K ((1/d) + (d))~(1/2), then with high probability two sample voting completes in a random d regular graph in O(log n) steps and the initial majority opinion wins. We also show the same performance for any regular graph, if ν_o ≥ Kλ_2, where λ_2 is the second largest eigenvalue of the transition matrix. In the graphs we consider, standard pull voting requires Ω(n) steps, and the minority can still win with probability |B|.
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机译:分布式投票是分布式计算中的基本主题。在拉投票中,在每个步骤中,每个顶点均会随机均匀地选择一个邻居,并采纳其意见。当所有顶点都持有相同的意见时,投票即告完成。在许多图类(包括规则图)上,即使最初只有两种不同的观点,拉投票也需要Ω(n)个预期步骤才能完成。在本文中,我们考虑了一个相关的过程,我们称其为两次抽样投票:每个顶点在每一步中选择两个随机邻居。如果这些邻居的意见一致,则顶点会根据所选样本修改其意见。否则,它会保留自己的意见。在两个(不同的)集合A和B的顶点分别存在两种不同意见的情况下,我们考虑此过程的执行情况。在这里,| A | + | B | = n是图的顶点数。我们证明存在一个常数K,如果两个观点之间的初始不平衡为ν_o=(| A |-| B |)/ n≥K((1 / d)+(d / n))〜(1 / 2),则很有可能在O(log n)步的随机d正则图中完成两个样本投票,并且最初的多数意见获胜。如果ν_o≥Kλ_2,则对于任何规则图,我们都将显示相同的性能,其中λ_2是过渡矩阵的第二大特征值。在我们考虑的图表中,标准拉票表决需要Ω(n)步,而少数仍可以| B | / n的概率获胜。
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