Cubic power functions with optimal second-order differential uniformity
Information Theory
2024-10-02 v2 Cryptography and Security
math.IT
Number Theory
Abstract
We discuss the second-order differential uniformity of vectorial Boolean functions. The closely related notion of second-order zero differential uniformity has recently been studied in connection to resistance to the boomerang attack. We prove that monomial functions with univariate form where and have optimal second-order differential uniformity. Computational results suggest that, up to affine equivalence, these might be the only optimal cubic power functions. We begin work towards generalising such conditions to all monomial functions of algebraic degree 3. We also discuss further questions arising from computational results.
Keywords
Cite
@article{arxiv.2409.03467,
title = {Cubic power functions with optimal second-order differential uniformity},
author = {Connor O'Reilly and Ana Sălăgean},
journal= {arXiv preprint arXiv:2409.03467},
year = {2024}
}