English

A Note on a Conjecture for Balanced Elementary Symmetric Boolean Functions

Information Theory 2015-03-20 v2 math.IT

Abstract

In 2008, Cusick {\it et al.} conjectured that certain elementary symmetric Boolean functions of the form σ2t+1l1,2t\sigma_{2^{t+1}l-1, 2^t} are the only nonlinear balanced ones, where tt, ll are any positive integers, and σn,d=1i1<...<idnxi1xi2...xid\sigma_{n,d}=\bigoplus_{1\le i_1<...<i_d\le n}x_{i_1}x_{i_2}...x_{i_d} for positive integers nn, 1dn1\le d\le n. In this note, by analyzing the weight of σn,2t\sigma_{n, 2^t} and σn,d\sigma_{n, d}, we prove that wt(σn,d)<2n1{\rm wt}(\sigma_{n, d})<2^{n-1} holds in most cases, and so does the conjecture. According to the remainder of modulo 4, we also consider the weight of σn,d\sigma_{n, d} from two aspects: n\equiv 3({\rm mod\}4) and n\not\equiv 3({\rm mod\}4). Thus, we can simplify the conjecture. In particular, our results cover the most known results. In order to fully solve the conjecture, we also consider the weight of σn,2t+2s\sigma_{n, 2^t+2^s} and give some experiment results on it.

Keywords

Cite

@article{arxiv.1203.1418,
  title  = {A Note on a Conjecture for Balanced Elementary Symmetric Boolean Functions},
  author = {Wei Su and Xiaohu Tang and Alexander Pott},
  journal= {arXiv preprint arXiv:1203.1418},
  year   = {2015}
}
R2 v1 2026-06-21T20:30:13.071Z