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arxiv: 2503.24236 · v1 · pith:NTQ7TE2Ynew · submitted 2025-03-31 · 📊 stat.CO · math.ST· stat.TH

Estimating a graph's spectrum via random Kirchhoff forests

classification 📊 stat.CO math.STstat.TH
keywords momentsspectralestimateforestsgraphdensitydistributioneigenvalues
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Exact eigendecomposition of large matrices is very expensive, and it is practically impossible to compute exact eigenvalues. Instead, one may set a more modest goal of approaching the empirical distribution of the eigenvalues, recovering the overall shape of the eigenspectrum. Current approaches to spectral estimation typically work with \emph{moments} of the spectral distribution. These moments are first estimated using Monte Carlo trace estimators, then the estimates are combined to approximate the spectral density. In this article we show how \emph{Kirchhoff forests}, which are random forests on graphs, can be used to estimate certain non-linear moments of very large graph Laplacians. We show how to combine these moments into an estimate of the spectral density. If the estimate's desired precision isn't too high, our approach paves the way to the estimation of a graph's spectrum in time sublinear in the number of links.

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Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Network node immunization: improving Netshield algorithm through random rooted forests

    cs.SI 2026-06 unverdicted novelty 5.0

    K-shield enhances Netshield by using random spanning forests to improve selection of k nodes that minimize the largest eigenvalue of the remaining graph's adjacency matrix, at identical computational cost.