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Öğe Graphs of vectorial plateaued functions as difference sets(Academic Press Inc Elsevier Science, 2021) Cesmelioglu, Ayca; Olmez, OktayA function F : F-pn -> F-pm , is a vectorial s-plateaued function if for each component function F-b(mu) = Tr-n(bF(x)), b is an element of F-pm* and mu is an element of F-pn , the Walsh transform value vertical bar(F-b) over cap(mu)vertical bar is either 0 or p(n+s/2) . In this paper, we explore the relation between (vectorial) s-plateaued functions and partial geometric difference sets. Moreover, we establish the link between three-valued cross-correlation of p-ary sequences and vectorial s-plateaued functions. Using this link, we provide a partition of F-3n into partial geometric difference sets. Conversely, using a partition of F-3n into partial geometric difference sets, we construct ternary plateaued functions f : F-3n -> F-3. We also give a characterization of p-ary plateaued functions in terms of special matrices which enables us to give the link between such functions and second-order derivatives using a different approach. (C) 2020 Elsevier Inc. All rights reserved.Öğe Vectorial bent functions and partial difference sets(Springer, 2021) Cesmelioglu, Ayca; Meidl, Wilfried; Pirsic, IsabelThe objective of this article is to broaden the understanding of the connections between bent functions and partial difference sets. Recently, the first two authors showed that the elements which a vectorial dual-bent function with certain additional properties maps to 0, form a partial difference set, which generalizes the connection between Boolean bent functions and Hadamard difference sets, and some later established connections between p-ary bent functions and partial difference sets to vectorial bent functions. We discuss the effects of coordinate transformations. As all currently known vectorial dual-bent functions F : F-p(n) -> F-p(s) are linear equivalent to l-forms, i.e., to functions satisfying F(beta x) = beta(l) F(x) for all beta is an element of F-p(s), we investigate properties of partial difference sets obtained from l-forms. We show that they are unions of cosets of F* p(s), which also can be seen as certain cyclotomic classes. We draw connections to known results on partial difference sets from cyclotomy. Motivated by experimental results, for a class of vectorial dual-bent functions from Fp(n) to Fp(s), we show that the preimage set of the squares of Fps forms a partial difference set. This extends earlier results on p-ary bent functions.Öğe Vectorial bent functions in odd characteristic and their components(Springer, 2020) Cesmelioglu, Ayca; Meidl, Wilfried; Pott, AlexanderBent functions in odd characteristic can be either (weakly) regular or non-weakly regular. Furthermore one can distinguish between dual-bent functions, which are bent functions for which the dual is bent as well, and non-dual bent functions. Whereas a weakly regular bent function always has a bent dual, a non-weakly regular bent function can be either dual-bent or non-dual-bent. The classical constructions (like quadratic bent functions, Maiorana-McFarland or partial spread) yield weakly regular bent functions, but meanwhile one knows constructions of infinite classes of non-weakly regular bent functions of both types, dual-bent and non-dual-bent. In this article we focus on vectorial bent functions in odd characteristic. We first show that mostp-ary bent monomials and binomials are actually vectorial constructions. In the second part we give a positive answer to the question if non-weakly regular bent functions can be components of a vectorial bent function. We present the first construction of vectorial bent functions of which the components are non-weakly regular but dual-bent, and the first construction of vectorial bent functions with non-dual-bent components.
