English

Trace Monomial Boolean Functions with Large High-Order Nonlinearities

Cryptography and Security 2023-09-21 v1 Computational Complexity Rings and Algebras

Abstract

Exhibiting an explicit Boolean function with a large high-order nonlinearity is an important problem in cryptography, coding theory, and computational complexity. We prove lower bounds on the second-order, third-order, and higher-order nonlinearities of some trace monomial Boolean functions. We prove lower bounds on the second-order nonlinearities of functions trn(x7)\mathrm{tr}_n(x^7) and trn(x2r+3)\mathrm{tr}_n(x^{2^r+3}) where n=2rn=2r. Among all trace monomials, our bounds match the best second-order nonlinearity lower bounds by \cite{Car08} and \cite{YT20} for odd and even nn respectively. We prove a lower bound on the third-order nonlinearity for functions trn(x15)\mathrm{tr}_n(x^{15}), which is the best third-order nonlinearity lower bound. For any rr, we prove that the rr-th order nonlinearity of trn(x2r+11)\mathrm{tr}_n(x^{2^{r+1}-1}) is at least 2n12(12r)n+r2r11O(2n2)2^{n-1}-2^{(1-2^{-r})n+\frac{r}{2^{r-1}}-1}- O(2^{\frac{n}{2}}). For rlog2nr \ll \log_2 n, this is the best lower bound among all explicit functions.

Keywords

Cite

@article{arxiv.2309.11229,
  title  = {Trace Monomial Boolean Functions with Large High-Order Nonlinearities},
  author = {Jinjie Gao and Haibin Kan and Yuan Li and Jiahua Xu and Qichun Wang},
  journal= {arXiv preprint arXiv:2309.11229},
  year   = {2023}
}
R2 v1 2026-06-28T12:27:06.658Z