Abstract :
We consider families of Markov random fields (MRFs) on an undirected graph using the exponential family representation. In earlier work [13] we proved that if the statistic that defines a family of MRFs is positively correlated, then the entropy is monotone decreasing in the exponential parameters. In this paper we address the converse, specifically within the context of the Ising model. The statistic for an edge is viewed as positive or negative as it favors similar or dissimilar values at the endpoints of the edge. We show that for an acyclic Ising model with no self statistics, the statistic is positively correlated regardless of the polarity of the edges. We further show that for a cyclic Ising model, the statistic is positively correlated if and only if the statistic is not frustrated; and that the entropy is monotone decreasing in the exponential parameters, if and only if the statistic is not frustrated.
Keywords :
Ising model; Markov processes; covariance analysis; entropy; graph theory; random processes; MRF; Markov random field; acyclic Ising model; covariance; edge polarity; entropy; exponential family representation; exponential parameter; statistic; undirected graph; Computational modeling; Entropy; Games; Image edge detection; Markov processes; Random variables; Silicon;
