The (homological) persistence of gerrymandering

IF 1.7 Q2 MATHEMATICS, APPLIED Foundations of data science (Springfield, Mo.) Pub Date : 2020-07-05 DOI:10.3934/FODS.2021007
M. Duchin, Tom Needham, Thomas Weighill
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引用次数: 9

Abstract

We apply persistent homology, the dominant tool from the field of topological data analysis, to study electoral redistricting. Our method combines the geographic information from a political districting plan with election data to produce a persistence diagram. We are then able to visualize and analyze large ensembles of computer-generated districting plans of the type commonly used in modern redistricting research (and court challenges). We set out three applications: zoning a state at each scale of districting, comparing elections, and seeking signals of gerrymandering. Our case studies focus on redistricting in Pennsylvania and North Carolina, two states whose legal challenges to enacted plans have raised considerable public interest in the last few years. To address the question of robustness of the persistence diagrams to perturbations in vote data and in district boundaries, we translate the classical stability theorem of Cohen--Steiner et al. into our setting and find that it can be phrased in a manner that is easy to interpret. We accompany the theoretical bound with an empirical demonstration to illustrate diagram stability in practice.
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选区划分不公的(同源)持续性
我们应用拓扑数据分析领域的主要工具持久同源性来研究选举选区的重新划分。我们的方法将政治区划计划中的地理信息与选举数据相结合,生成持久图。然后,我们能够可视化和分析现代重新划分研究(和法庭挑战)中常用的计算机生成的大规模划分计划。我们提出了三个应用程序:按每种选区划分一个州,比较选举,以及寻找不公正选区划分的信号。我们的案例研究集中在宾夕法尼亚州和北卡罗来纳州的重新划分,这两个州对已颁布计划的法律挑战在过去几年中引起了相当大的公众兴趣。为了解决持久性图对投票数据和地区边界扰动的稳健性问题,我们将Cohen–Steiner等人的经典稳定性定理转化为我们的设置,并发现它可以用一种易于解释的方式来表达。我们在理论界的同时进行了实证论证,以说明图表在实践中的稳定性。
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