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Perfect sampling from spatial mixing

We introduce a new perfect sampling technique that can be applied to general Gibbs distributions and runs in linear time if the correlation decays faster than the neighborhood growth. In particular, in graphs with sub-exponential neighborhood growth like $\mathbb{Z}^d$, our algorithm achieves linear running time as long as Gibbs sampling is rapidly mixing. As concrete applications, we obtain the currently best perfect samplers for colorings and for monomer-dimer models in such graphs.

preprint2020arXivOpen access

Weiming Feng Heng Guo Yitong Yin

Data Structures and Algorithms

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Weiming Feng Heng Guo Yitong Yin

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Perfect sampling from spatial mixing

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