Pairwise Negative Correlation for Uniform Spanning Subgraphs of the Complete Graph
Abstract
We investigate the pairwise negative correlation (p-NC) property for uniform probability measures on several families of spanning subgraphs of the complete graph Kn. Motivated by conjectured negative dependence properties of the random-cluster model with q<1, we focus on three natural families: the set of all connected spanning subgraphs, the set of forests with exactly k components, and the set of connected spanning subgraphs with excess k, where k is a fixed integer. We prove that for each of these families, the associated uniform measure satisfies the p-NC property provided n is sufficiently large. Our results extend earlier work on uniform forests and provide the first verification of the p-NC property for uniform connected subgraphs and their truncations on complete graphs.
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