Construction of relative difference sets in p-groups

## Abstract Latin square type partial difference sets (PDS) are known to exist in __R__ × __R__ for various abelian __p__‐groups __R__ and in ℤ^__t__^. We construct a family of Latin square type PDS in ℤ^__t__^ × ℤ^2__nt__^~__p__~ using finite commutative chain rings. When __t__ is odd, the ambient

gave two new constructions for semi-regular relative di!erence sets (RDSs). They asked if the two constructions could be uni"ed. In this paper, we show that the two constructions are closely related. In fact, the second construction should be viewed as an extension of the "rst. Furthermore, we gener

In this paper, we "rst determine the exact values of s(2, t), a function de"ned by X.-D. Hou [preprint], which depends on the structure of GR(4, t). This result gives the exact range of parameters of the partial di!erence sets in 9R constructed by Chen et al. (J. Combin. ¹heory Ser. A 76 (1996), 179

## Abstract For cryptographic purposes, we want to find functions with both low differential uniformity and dissimilarity to all linear functions and to know when such functions are essentially different. For vectorial Boolean functions, extended affine equivalence and the coarser Carlet–Charpin–Zi

## Abstract Let __G__ be a finite group other than ℤ~4~ and suppose that __G__ contains a semiregular relative difference set (RDS) relative to a central subgroup __U__. We apply Gaschütz' Theorem from finite group theory to show that if __G__/__U__ has cyclic Sylow subgroups for each prime divisor

In a previous paper, [Des., Codes and Cryptogr. 8 (1996), 215 227]; we used Galois rings to construct partial difference sets, relative difference sets and a difference set. In the present paper, we first generalize and improve the construction of partial difference sets in [Des., Codes and Cryptogr