On q-ary Bent and Plateaued Functions

Abstract

We obtain the following results. For any prime q the minimal Hamming distance between distinct regular q-ary bent functions of 2n variables is equal to qn. The number of q-ary regular bent functions at the distance qn from the quadratic bent function Qn=x1x2+…+x2n-1x2n is equal to qn(qn-1+1)·s(q+1)(q-1) for q>2. The Hamming distance between distinct binary s-plateaued functions of n variables is not less than 2s+n-22 and the Hamming distance between distinctternary s-plateaued functions of n variables is not less than 3s+n-12. These bounds are tight. For q=3 we prove an upper bound on nonlinearity of ternary functions in terms of their correlation immunity. Moreover, functions reaching this bound are plateaued. For q=2 analogous result are well known but for large q it seems impossible. Constructions and some properties of q-ary plateaued functions are discussed.