Misra, NeeldharaNeeldharaMisraNayak, DebanujDebanujNayak2025-08-312025-08-312022-01-01[9783030950170]10.1007/978-3-030-95018-7_212-s2.0-85124651411http://repository.iitgn.ac.in/handle/IITG2025/26247We study the computational complexity of finding fair allocations of indivisible goods in the setting where a social network on the agents is given. Notions of fairness in this context are “localized”, that is, agents are only concerned about the bundles allocated to their neighbors, rather than every other agent in the system. We comprehensively address the computational complexity of finding locally envy-free and Pareto efficient allocations in the setting where the agents have binary valuations for the goods and the underlying social network is modeled by an undirected graph. We study the problem in the framework of parameterized complexity. We show that the problem is computationally intractable even in fairly restricted scenarios, for instance, even when the underlying graph is a path. We show NP-hardness for settings where the graph has only two distinct valuations among the agents. We demonstrate W-hardness with respect to the number of goods or the size of the vertex cover of the underlying graph. We also consider notions of proportionality that respect the structure of the underlying graph.falseEnvy-freeness | Fair division | Parameterized complexity | Social networksConference Paperhttps://arxiv.org/pdf/2111.1152816113349265-27820224cpBook Series2