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Bibliographic Details
Main Author: Relia, Kunal
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2402.19365
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author Relia, Kunal
author_facet Relia, Kunal
contents Consider a committee election consisting of (i) a set of candidates who are divided into arbitrary groups each of size ${at~most}$ two and a diversity constraint that stipulates the selection of ${at~least}$ one candidate from each group and (ii) a set of voters who are divided into arbitrary populations each approving ${at~most}$ two candidates and a representation constraint that stipulates the selection of ${at~least}$ one candidate from each population who has a non-null set of approved candidates. The DiRe (Diverse + Representative) committee feasibility problem (a.k.a. the minimum vertex cover problem on unweighted undirected graphs) concerns the determination of the smallest size committee that satisfies the given constraints. Here, for this problem, we propose an algorithm that is an amalgamation of maximum matching, breadth-first search, maximal matching, and local minimization. We prove the algorithm terminates in polynomial-time. We conjecture the algorithm is an unconditional deterministic polynomial-time algorithm.
format Preprint
id arxiv_https___arxiv_org_abs_2402_19365
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle On Efficient Computation of DiRe Committees
Relia, Kunal
Computational Complexity
Computers and Society
Computer Science and Game Theory
Consider a committee election consisting of (i) a set of candidates who are divided into arbitrary groups each of size ${at~most}$ two and a diversity constraint that stipulates the selection of ${at~least}$ one candidate from each group and (ii) a set of voters who are divided into arbitrary populations each approving ${at~most}$ two candidates and a representation constraint that stipulates the selection of ${at~least}$ one candidate from each population who has a non-null set of approved candidates. The DiRe (Diverse + Representative) committee feasibility problem (a.k.a. the minimum vertex cover problem on unweighted undirected graphs) concerns the determination of the smallest size committee that satisfies the given constraints. Here, for this problem, we propose an algorithm that is an amalgamation of maximum matching, breadth-first search, maximal matching, and local minimization. We prove the algorithm terminates in polynomial-time. We conjecture the algorithm is an unconditional deterministic polynomial-time algorithm.
title On Efficient Computation of DiRe Committees
topic Computational Complexity
Computers and Society
Computer Science and Game Theory
url https://arxiv.org/abs/2402.19365