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Paper detail

Smoothing graph signals via random spanning forests

Another facet of the elegant link between random processes on graphs and Laplacian-based numerical linear algebra is uncovered: based on random spanning forests, novel Monte-Carlo estimators for graph signal smoothing are proposed. These random forests are sampled efficiently via a variant of Wilson's algorithm --in time linear in the number of edges. The theoretical variance of the proposed estimators are analyzed, and their application to several problems are considered, such as Tikhonov denoising of graph signals or semi-supervised learning for node classification on graphs.

preprint2020arXivOpen access
Yusuf Y. PilavciPierre-Olivier AmblardSimon BarthelméNicolas Tremblay
Discrete Mathematics
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Yusuf Y. PilavciPierre-Olivier AmblardSimon BarthelméNicolas Tremblay

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