The Complexity of Envy-Free Graph Cutting

December 12, 2023 Β· Declared Dead Β· πŸ› International Joint Conference on Artificial Intelligence

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Authors Argyrios Deligkas, Eduard Eiben, Robert Ganian, Thekla Hamm, Sebastian Ordyniak arXiv ID 2312.07043 Category cs.DS: Data Structures & Algorithms Cross-listed cs.AI, cs.CC Citations 5 Venue International Joint Conference on Artificial Intelligence Last Checked 3 months ago
Abstract
We consider the problem of fairly dividing a set of heterogeneous divisible resources among agents with different preferences. We focus on the setting where the resources correspond to the edges of a connected graph, every agent must be assigned a connected piece of this graph, and the fairness notion considered is the classical envy freeness. The problem is NP-complete, and we analyze its complexity with respect to two natural complexity measures: the number of agents and the number of edges in the graph. While the problem remains NP-hard even for instances with 2 agents, we provide a dichotomy characterizing the complexity of the problem when the number of agents is constant based on structural properties of the graph. For the latter case, we design a polynomial-time algorithm when the graph has a constant number of edges.
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