Christian Reiher
Published 2024-08-27Version 1
We classify the sum-free subsets of ${\mathbb F}_3^n$ whose density exceeds $\frac16$. This yields a resolution of Vsevolod Lev's periodicity conjecture, which asserts that if a sum-free subset ${A\subseteq {\mathbb F}_3^n}$ is maximal with respect to inclusion and aperiodic (in the sense that there is no non-zero vector $v$ satisfying $A+v=A$), then $|A|\le \frac12(3^{n-1}+1)$ -- a bound known to be optimal if $n\ne 2$, while for $n=2$ there are no such sets.
On the maximum size of a $(k,l)$-sum-free subset of an abelian group
Large sum-free sets in finite vector spaces I
Same average in every direction
![QR code for arXiv:2408.15174 [math.CO]](http://oss.arxitics.com/images/favicon.svg)