Representing the inverse map as a composition of quadratics in a finite field of characteristic 2

Abstract

In 1953, Carlitz~Car53 showed that all permutation polynomials over q, where q>2 is a power of a prime, are generated by the special permutation polynomials xq-2 (the inversion) and ax+b (affine functions, where 0≠ a, b∈ q). Recently, Nikova, Nikov and Rijmen~NNR19 proposed an algorithm (NNR) to find a decomposition of the inverse function in quadratics, and computationally covered all dimensions n≤ 16. Petrides~P23 found a class of integers for which it is easy to decompose the inverse into quadratics, and improved the NNR algorithm, thereby extending the computation up to n≤ 32. Here, we extend Petrides' result, as well as we propose a number theoretical approach, which allows us to cover easily all (surely, odd) exponents up to~250, at least.