Approximate Envy-Free Allocations up to any k Goods

Abstract

We study the problem of finding approximate envy-free allocations up to any k goods (α-EFkX), when agents have additive values over goods in a bundle. As our main result, we show that for any k>2, k+1k+2-EFkX allocations exist for any number of agents, and can be computed in polynomial time, via an appropriate generalization of the 3PA algorithm of [Amanatidis et al., 2024]. An immediate corollary of this result is that 3/4-EF2X allocations exist for any number of agents; in contrast, 2/3-EFX allocations are only known to exist for up to 7 agents. We improve this latter result by devising an algorithm that achieves 2/3-EFX for 8 agents. We also consider EFkX graph orientations; we prove that such orientations do not always exist, and that deciding their existence is NP-complete, thereby generalizing the corresponding result of [Christodoulou et., 2023] for k=1.