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Bibliographic Details
Main Author: Gold, Micah
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2606.01333
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author Gold, Micah
author_facet Gold, Micah
contents ReCom is a leading Markov Chain Monte Carlo algorithm for sampling balanced graph partitions in computational redistricting. At each step, its transition function proposes a new partition by merging two adjacent districts and if possible re-splitting the conjoined region. The transition function is efficient in practice, however, it is unknown whether it is guaranteed to run in polynomial time. In this report we exhibit an explicit family of 3-partitions on planar square grid graphs from which ReCom requires an exponentially large expected number of steps to re-split the graph (even if we admit approximately balanced splits), showing that in the worst case ReCom does not run in polynomial time. Notably, this result implies that ReCom is not technically rapidly mixing (if started from an adversarial configuration, ReCom requires exponential many steps to reach the stationary distribution).
format Preprint
id arxiv_https___arxiv_org_abs_2606_01333
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Adversarial Configurations for the ReCom Transition Function
Gold, Micah
Data Structures and Algorithms
Discrete Mathematics
ReCom is a leading Markov Chain Monte Carlo algorithm for sampling balanced graph partitions in computational redistricting. At each step, its transition function proposes a new partition by merging two adjacent districts and if possible re-splitting the conjoined region. The transition function is efficient in practice, however, it is unknown whether it is guaranteed to run in polynomial time. In this report we exhibit an explicit family of 3-partitions on planar square grid graphs from which ReCom requires an exponentially large expected number of steps to re-split the graph (even if we admit approximately balanced splits), showing that in the worst case ReCom does not run in polynomial time. Notably, this result implies that ReCom is not technically rapidly mixing (if started from an adversarial configuration, ReCom requires exponential many steps to reach the stationary distribution).
title Adversarial Configurations for the ReCom Transition Function
topic Data Structures and Algorithms
Discrete Mathematics
url https://arxiv.org/abs/2606.01333