The Zero-Difference Properties of Functions and Their Applications

Abstract

A function f from an Abelian group (A,+) to an Abelian group (B,+) is (n, m, S) zero-difference (ZD), if S=\λα α ∈ A\0\\ where n=|A|, m=|f(A)| and λα=|\x ∈ A f(x+α)=f(x)\|. A function is called zero-difference balanced (ZDB) if S=\λ\ where λ is a constant number. ZDB functions have many good applications. However it is point out that many known zero-difference balanced functions are already given in the language of partitioned difference family (PDF). The problem that whether zero-difference ``not balanced" functions still have good applications as ZDB functions, is investigated in this paper. By using the change point technic, zero-difference functions with good applications are constructed from known ZDB functions. Then optimal difference systems of sets (DSS) and optimal frequency-hopping sequences (FHS) are obtained with new parameters. Furthermore the sufficient and necessary conditions of these objects being optimal, are given.