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Nishimori meets Bethe: a spectral method for node classification in sparse weighted graphs

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This article unveils a new relation between the Nishimori temperature parametrizing a distribution P and the Bethe free energy on random Erdős–Rényi graphs with edge weights distributed according to P.… Click to show full abstract

This article unveils a new relation between the Nishimori temperature parametrizing a distribution P and the Bethe free energy on random Erdős–Rényi graphs with edge weights distributed according to P. Estimating the Nishimori temperature being a task of major importance in Bayesian inference problems, as a practical corollary of this new relation, a numerical method is proposed to accurately estimate the Nishimori temperature from the eigenvalues of the Bethe Hessian matrix of the weighted graph. The algorithm, in turn, is used to propose a new spectral method for node classification in weighted (possibly sparse) graphs. The superiority of the method over competing state-of-the-art approaches is demonstrated both through theoretical arguments and real-world data experiments.

Keywords: method node; method; nishimori temperature; spectral method; node classification

Journal Title: Journal of Statistical Mechanics: Theory and Experiment
Year Published: 2021

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