Saved in:
Bibliographic Details
Main Authors: Cutrone, Joseph, Wunder, Tyler C.
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2505.09100
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866908910994063360
author Cutrone, Joseph
Wunder, Tyler C.
author_facet Cutrone, Joseph
Wunder, Tyler C.
contents The apportionment problem asks how to assign representation to states based on their populations. That is, given census data and a fixed number of seats, how many seats should each state be assigned? Various algorithms exist to solve the apportionment problem, but by the Balinski-Young Impossibility Theorem, every such algorithm will be flawed in some way. This paper focuses on divisor methods of apportionment, where the possible flaws are known as quota violations. This paper presents a detailed analysis of quota violations that can arise under divisor methods for three states, By focusing on the three-state case, the paper makes the consequences of the Balinski-Young theorem particularly transparent and allows for a precise classification of quota violations that is difficult to obtain in more general formulations. The study focuses on quota violations in the Adams, Jefferson, Dean, and the Huntington-Hill methods when allocating M seats, but is expandable to a wider class of divisor functions. Theoretical results are proved about the behavior of these methods, particularly focusing on the types of quota violations that may occur, their frequency, and their structure and geometry. The key results of the paper are tests to detect quota violations which are employed to understand the geometry of violations and construct a probability function which calculates the likelihood of such violations occurring given an initial three state population vector whose components follow varying distributions.
format Preprint
id arxiv_https___arxiv_org_abs_2505_09100
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Quantifying the Balinski-Young Theorem: Structure and Probability of Quota Violations in Divisor Methods for Three States
Cutrone, Joseph
Wunder, Tyler C.
Probability
The apportionment problem asks how to assign representation to states based on their populations. That is, given census data and a fixed number of seats, how many seats should each state be assigned? Various algorithms exist to solve the apportionment problem, but by the Balinski-Young Impossibility Theorem, every such algorithm will be flawed in some way. This paper focuses on divisor methods of apportionment, where the possible flaws are known as quota violations. This paper presents a detailed analysis of quota violations that can arise under divisor methods for three states, By focusing on the three-state case, the paper makes the consequences of the Balinski-Young theorem particularly transparent and allows for a precise classification of quota violations that is difficult to obtain in more general formulations. The study focuses on quota violations in the Adams, Jefferson, Dean, and the Huntington-Hill methods when allocating M seats, but is expandable to a wider class of divisor functions. Theoretical results are proved about the behavior of these methods, particularly focusing on the types of quota violations that may occur, their frequency, and their structure and geometry. The key results of the paper are tests to detect quota violations which are employed to understand the geometry of violations and construct a probability function which calculates the likelihood of such violations occurring given an initial three state population vector whose components follow varying distributions.
title Quantifying the Balinski-Young Theorem: Structure and Probability of Quota Violations in Divisor Methods for Three States
topic Probability
url https://arxiv.org/abs/2505.09100