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The Chromatic Number of Kneser Hypergraphs and Its Connection to the Consensus Division Problem


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This paper reveals a novel connection between the chromatic number of Kneser hypergraphs and the consensus division problem, leading to a new proof for Kˇr´ıˇz’s lower bound on the chromatic number and establishing a reduction from the KNESERp problem to the approximate CON-p-DIVISION problem.
Resumé

This research paper explores the relationship between the chromatic number of Kneser hypergraphs and the consensus division problem.

Bibliographic Information: Haviv, I. (2024). The Chromatic Number of Kneser Hypergraphs via Consensus Division [Computer Science]. arXiv. arXiv:2311.09016v2

Research Objective: The paper aims to establish a novel connection between two seemingly disparate areas: determining the chromatic number of Kneser hypergraphs (a graph theory problem) and the consensus division problem (a fair division problem).

Methodology: The authors utilize a novel proof technique that leverages the Consensus Division theorem to establish a lower bound for the chromatic number of Kneser hypergraphs. This approach diverges from traditional methods relying on topological tools, offering a new perspective on the problem. Furthermore, the authors explore the computational complexity implications of their proof by constructing a reduction from the KNESERp problem, which seeks a monochromatic hyperedge in a Kneser hypergraph, to the CON-p-DIVISION problem, which aims to divide an interval into pieces with equal value according to given functions.

Key Findings: The paper presents a new proof for Kˇr´ıˇz’s lower bound on the chromatic number of Kneser hypergraphs using the Consensus Division theorem. This connection allows for an efficient reduction from the KNESERp problem with subset queries to a weak approximation of the CON-p-DIVISION problem. Specifically, the KNESER problem with subset queries is reducible to the CON-HALVING[<1] problem on normalized monotone functions. Additionally, the paper demonstrates that the KNESERp problem belongs to the complexity class PPA-p for any prime p.

Main Conclusions: The research highlights a deep and previously unexplored connection between graph coloring and fair division problems. The reduction from KNESERp to approximate CON-p-DIVISION opens new avenues for understanding the computational complexity of these problems. The membership of KNESERp in PPA-p provides further insight into its complexity.

Significance: This work significantly contributes to the fields of graph theory and computational complexity by uncovering a novel link between Kneser hypergraph coloring and consensus division. This connection offers a fresh perspective on both problems and paves the way for future research in both areas.

Limitations and Future Research: The paper primarily focuses on theoretical connections and complexity results. Further research could explore practical algorithms leveraging these insights to solve Kneser hypergraph coloring or consensus division problems more efficiently. Additionally, investigating the tightness of the reduction and exploring potential applications in other domains could be promising research directions.

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by Ishay Haviv kl. arxiv.org 11-25-2024

https://arxiv.org/pdf/2311.09016.pdf
The Chromatic Number of Kneser Hypergraphs via Consensus Division

Dybere Forespørgsler

Can the connection between Kneser hypergraph coloring and consensus division be exploited to develop practical algorithms for either problem?

While the connection between Kneser hypergraph coloring and consensus division is theoretically fascinating, leveraging it for practical algorithms is not straightforward. Here's why: Complexity of Consensus Division: Even though the Consensus Division theorem guarantees the existence of a solution, finding it is computationally challenging. The CON-HALVING problem, a special case of consensus division, is PPA-complete, suggesting that finding exact solutions efficiently might be impossible. Existing algorithms for approximate consensus division often rely on continuous methods or have complexity bounds that become impractical for larger instances. Nature of the Reduction: The reductions presented in the paper are from KNESERp with subset queries to approximate CON-p-DIVISION. This means that even if we had an efficient algorithm for approximate CON-p-DIVISION, it wouldn't directly translate to an algorithm for the standard KNESERp problem. The subset query oracle provides significant power, and removing it might make the problem inherently harder. Specificity of Kneser Hypergraphs: Kneser hypergraphs possess a very specific structure. Algorithms tailored for general hypergraph coloring might not be efficient for Kneser hypergraphs, and vice-versa. The insights gained from the connection to consensus division might not easily generalize to other hypergraph coloring problems. Potential Avenues: Approximation Algorithms: Exploring approximation algorithms for both Kneser hypergraph coloring and consensus division could be fruitful. The connection might inspire new algorithmic ideas or provide tools for analyzing the approximation guarantees of existing algorithms. Restricted Instances: Studying restricted instances of both problems, such as Kneser hypergraphs with specific parameters or consensus division with specific types of valuation functions, might lead to more practical algorithms.

Could there be alternative proof techniques for Kˇr´ıˇz’s lower bound that do not rely on the Consensus Division theorem but still offer insights into computational complexity?

It's certainly possible. While the Consensus Division theorem provides an elegant route to Kˇr´ıˇz’s lower bound, alternative proof techniques could offer different computational perspectives. Here are some possibilities: Combinatorial Methods: Exploring purely combinatorial arguments, perhaps building upon existing proofs for special cases of Kneser hypergraphs, might lead to constructive proofs that translate more directly into algorithms. Alternative Topological Tools: The original proofs for Kneser hypergraph coloring relied heavily on topological tools like the Borsuk-Ulam theorem. Investigating different topological invariants or fixed-point theorems might offer new complexity insights. Duality and Linear Programming: Many combinatorial problems have dual formulations in terms of linear programs. Exploring such formulations for Kneser hypergraph coloring might reveal connections to other well-studied problems with known complexity bounds. Benefits of Alternative Proofs: New Complexity Classes: Different proof techniques might highlight connections to different complexity classes, potentially revealing a richer complexity landscape for Kneser hypergraph coloring. Finer-Grained Complexity: Alternative approaches might allow for a more fine-grained analysis of the problem's complexity, potentially leading to hardness results for specific parameter regimes or approximation factors. Algorithmic Implications: Constructive proofs or proofs based on well-understood algorithmic paradigms could directly inspire new algorithms for Kneser hypergraph coloring.

What are the implications of this research for other areas where graph theory and fair division intersect, such as resource allocation or social choice theory?

The connection between Kneser hypergraph coloring and consensus division hints at a deeper interplay between graph theory and fair division, with potential implications for areas like resource allocation and social choice theory: Resource Allocation with Disjoint Constraints: Kneser hypergraphs, by definition, encode disjointness constraints. The research could inspire new approaches to resource allocation problems where resources cannot be shared arbitrarily, such as assigning time slots, frequency bands, or computational resources. Fair Division with Complex Preferences: The use of continuous valuation functions in consensus division allows for modeling complex preferences. The connection to graph theory might lead to new methods for representing and reasoning about such preferences in fair division problems. Coalition Formation and Voting: Kneser hypergraphs can represent relationships between agents or voters, where hyperedges denote incompatible coalitions. The research could offer insights into the complexity of finding stable coalition structures or designing voting mechanisms that satisfy fairness criteria. Potential Research Directions: Modeling Social Networks: Exploring how Kneser hypergraphs and related concepts can model social networks with constraints on group formation or interaction. Mechanism Design for Fair Allocation: Designing algorithms or mechanisms for resource allocation problems inspired by the connection between Kneser hypergraphs and consensus division. Analyzing Complexity of Social Choice Procedures: Investigating the computational complexity of social choice procedures using tools and insights from graph theory and fair division.
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