Some New Constructions of Generalized Plateaued Functions

Abstract

Plateaued functions as an extension of bent functions play a significant role in cryptography, coding theory, sequences and combinatorics. In Mesnager9, Mesnager et al. introduced generalized plateaued functions in order to study plateaued functions in the general context of generalized p-ary functions. In this paper, we focus on the constructions of generalized p-ary s-plateaued functions from Vn to Zpk, where Vn is an n-dimensional vector space over Fp, p is a prime, k≥ 1 and n+s is even when p=2. In particular, when k=1, the constructions in this paper are applicable for plateaued functions. Firstly, inspired by the work of Hodzi\'c et al. Hodzic3 for Boolean plateaued functions, we characterize generalized plateaued functions with affine Walsh supports and provide constructions of generalized plateaued functions with (non)-affine Walsh supports by spectral method. When p=2, k=1, our constructions of Boolean plateaued functions with (non)-affine Walsh supports provide an answer to the Open Problem 2 proposed in Hodzic3. Secondly, based on what we called generalized indirect sum, we give constructions of generalized plateaued functions, which are also applicable for (non)-weakly regular generalized bent functions. In the end, we discuss the constructions of pairwise disjoint spectra generalized plateaued functions with (non)-affine Walsh supports and we present a construction of generalized bent functions by using pairwise disjoint spectra generalized plateaued functions as building blocks.