On Graham's rearrangement conjecture over $\mathbb{F}_2^n$

TL;DR

This paper proves that large enough subsets of the vector space over f2^n admit a valid ordering, resolving a long-standing conjecture for this case using advanced combinatorial techniques.

Contribution

It provides an almost complete resolution of Graham's rearrangement conjecture over f2^n, establishing conditions under which subsets admit valid orderings.

Findings

Every sufficiently large subset of f2^n admits a valid ordering.

Subsets of size at least |G|^{1-c} admit valid orderings for any group G.

The proof introduces a structural decomposition of Cayley graphs into quasirandom parts.

Abstract

A sequence $s_1,s_2,\ldots, s_k$ of elements of a group $G$ is called a valid ordering if the partial products $s_1, s_1 s_2, \ldots, s_1\cdots s_k$ are all distinct. A long-standing problem in combinatorial group theory asks whether, for a given group $G$, every subset $S \subseteq G\setminus \{\mathrm{id}\}$ admits a valid ordering; the instance of the additive group $\mathbb{F}_p$ is the content of a well-known 1971 conjecture of Graham. Most partial progress to date has concerned the edge cases where either $S$ or $G \setminus S$ is quite small. Our main result is an essentially complete resolution of the problem for $G=\mathbb{F}_2^n$: we show that there is an absolute constant $C>0$ such that every subset $S\subseteq \mathbb{F}_2^n \setminus \{0\}$ of size at least $C$ admits a valid ordering. Our proof combines techniques from additive and probabilistic combinatorics, including the Freiman--Ruzsa theorem and the absorption method. Along the way, we also solve the general problem for moderately large subsets: there is a constant $c>0$ such that for every group $G$ (not necessarily abelian), every subset $S \subseteq G\setminus \{\mathrm{id}\}$ of size at least $|G|^{1-c}$ admits a valid ordering. Previous work in this direction concerned only sets of size at least $(1-o(1))|G|$. A main ingredient in our proof is a structural result, similar in spirit to the Arithmetic Regularity Lemma, showing that every Cayley graph can be efficiently decomposed into mildly quasirandom components.