Cryptographically Strong Permutations from the Butterfly Structure

Abstract

In this paper, we present infinite families of permutations of F22n with high nonlinearity and boomerang uniformity 4 from generalized butterfly structures. Both open and closed butterfly structures are considered. It appears, according to experiment results, that open butterflies do not produce permutation with boomerang uniformity 4. For the closed butterflies, we propose the condition on coefficients α, β ∈ F2n such that the functions Vi := (Ri(x,y), Ri(y,x)) with Ri(x,y)=(x+α y)2i+1+β y2i+1 are permutations of F2n2 with boomerang uniformity 4, where n≥ 1 is an odd integer and (i, n)=1. The main result in this paper consists of two major parts: the permutation property of Vi is investigated in terms of the univariate form, and the boomerang uniformity is examined in terms of the original bivariate form. In addition, experiment results for n=3, 5 indicates that the proposed condition seems to cover all coefficients α, β ∈ F2n that produce permutations Vi with boomerang uniformity 4. However, the experiment result shows that the quadratic permutation Vi seems to be affine equivalent to the Gold function. Therefore, unluckily, we may not to obtain new permutations with boomerang uniformity 4 from the butterfly structure.