The GHS and other correlation inequalities for the two-star model

Pub Date : 2021-07-19 DOI:10.30757/ALEA.v19-64
A. Bianchi, Francesca Collet, Elena Magnanini
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引用次数: 1

Abstract

. We consider the two-star model, a family of exponential random graphs indexed by two real parameters, h and α , that rule respectively the total number of edges and the mutual dependence between them. Borrowing tools from statistical mechanics, we study different classes of correlation inequalities for edges, that naturally emerge while taking the partial derivatives of the (finite size) free energy. In particular, if α, h ≥ 0 , we derive first and second order correlation inequalities and then prove the so-called GHS inequality. As a consequence, under the above conditions on the parameters, the average edge density turns out to be an increasing and concave function of the parameter h , at any fixed size of the graph. Some of our results can be extended to more general classes of exponential random graphs.
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双星模型的GHS和其他相关不等式
.我们考虑双星模型,这是一组由两个实参数h和α索引的指数随机图,它们分别规定了边的总数和它们之间的相互依赖性。借用统计力学的工具,我们研究了不同类别的边的相关不等式,这些不等式在取(有限大小)自由能的偏导数时自然出现。特别地,如果α,h≥0,我们导出一阶和二阶相关不等式,然后证明所谓的GHS不等式。因此,在上述参数条件下,在任何固定的图形大小下,平均边缘密度都是参数h的递增和凹入函数。我们的一些结果可以推广到更一般的指数随机图类。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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