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arxiv: 2007.07494 · v1 · pith:ADGUS5ALnew · submitted 2020-07-15 · 💻 cs.DM · math.CO· math.PR

Inference and mutual information on random factor graphs

classification 💻 cs.DM math.COmath.PR
keywords factorinformationmodelmutualblockgraphsrandomstochastic
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Random factor graphs provide a powerful framework for the study of inference problems such as decoding problems or the stochastic block model. Information-theoretically the key quantity of interest is the mutual information between the observed factor graph and the underlying ground truth around which the factor graph was created; in the stochastic block model, this would be the planted partition. The mutual information gauges whether and how well the ground truth can be inferred from the observable data. For a very general model of random factor graphs we verify a formula for the mutual information predicted by physics techniques. As an application we prove a conjecture about low-density generator matrix codes from [Montanari: IEEE Transactions on Information Theory 2005]. Further applications include phase transitions of the stochastic block model and the mixed $k$-spin model from physics.

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