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Paper detail

Inference and learning in sparse systems with multiple states

We discuss how inference can be performed when data are sampled from the non-ergodic phase of systems with multiple attractors. We take as model system the finite connectivity Hopfield model in the memory phase and suggest a cavity method approach to reconstruct the couplings when the data are separately sampled from few attractor states. We also show how the inference results can be converted into a learning protocol for neural networks in which patterns are presented through weak external fields. The protocol is simple and fully local, and is able to store patterns with a finite overlap with the input patterns without ever reaching a spin glass phase where all memories are lost.

preprint2011arXivOpen access
A. BraunsteinA. RamezanpourR. ZecchinaP. Zhang
cond-mat.dis-nn
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A. BraunsteinA. RamezanpourR. ZecchinaP. Zhang

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