English

Fixed-point cycles and EFX allocations

Data Structures and Algorithms 2022-01-24 v1 Combinatorics

Abstract

We study edge-labelings of the complete bidirected graph Kn\overset{\tiny\leftrightarrow}{K}_n with functions from the set [d]={1,,d}[d] = \{1, \dots, d\} to itself. We call a cycle in Kn\overset{\tiny\leftrightarrow}{K}_n a fixed-point cycle if composing the labels of its edges results in a map that has a fixed point, and we say that a labeling is fixed-point-free if no fixed-point cycle exists. For a given dd, we ask for the largest value of nn, denoted Rf(d)R_f(d), for which there exists a fixed-point-free labeling of Kn\overset{\tiny\leftrightarrow}{K}_n. Determining Rf(d)R_f(d) for all d>0d >0 is a natural Ramsey-type question, generalizing some well-studied zero-sum problems in extremal combinatorics. The problem was recently introduced by Chaudhury, Garg, Mehlhorn, Mehta, and Misra, who proved that dRf(d)d4+dd \leq R_f(d) \leq d^4+d and showed that the problem has close connections to EFX allocations, a central problem of fair allocation in social choice theory. In this paper we show the improved bound Rf(d)d2+o(1)R_f(d) \leq d^{2 + o(1)}, yielding an efficient (1ε){{(1-\varepsilon)}}-EFX allocation with nn agents and O(n0.67)O(n^{0.67}) unallocated goods for any constant ε(0,1/2]\varepsilon \in (0,1/2]; this improves the bound of O(n0.8)O(n^{0.8}) of Chaudhury, Garg, Mehlhorn, Mehta, and Misra. Additionally, we prove the stronger upper bound 2d22d-2, in the case where all edge-labels are permulations. A very special case of this problem, that of finding zero-sum cycles in digraphs whose edges are labeled with elements of Zd\mathbb{Z}_d, was recently considered by Alon and Krivelevich and by M\'{e}sz\'{a}ros and Steiner. Our result improves the bounds obtained by these authors and extends them to labelings from an arbitrary (not necessarily commutative) group, while also simplifying the proof.

Cite

@article{arxiv.2201.08753,
  title  = {Fixed-point cycles and EFX allocations},
  author = {Benjamin Aram Berendsohn and Simona Boyadzhiyska and László Kozma},
  journal= {arXiv preprint arXiv:2201.08753},
  year   = {2022}
}
R2 v1 2026-06-24T08:57:54.042Z