On the Existence of Abelian Hadamard Difference Sets and a New Family of Difference Sets

## Abstract We constrain the structure of difference sets with classical parameters in abelian groups. These include the classical Singer 7 and Gordon et al. 4 constructions and also more recent constructions due to Helleseth et al. 5, 6 arising from the study of sequences with ideal autocorrelatio

We formulate and solve a collection of functional equations arising in the framework of fuzzy logic when modeling the concept of a difference operation between couples of fuzzy sets.

We construct a family of partial difference sets with Denniston parameters in the group Z t 4 × Z t 2 by using Galois rings.

This paper contains a discussion of cocyclic Hadamard matrices, their associated relative difference sets, and regular group actions. Nearly all central extensions of the elementary abelian 2-groups by Z 2 are shown to act regularly on the associated group divisible design of the Sylvester Hadamard

Linear codes over GF(5) are utilized for the construction of a reversible abelian Hadamard difference set in Z 2 \_Z 2 \_Z 4 5 . This is the first example of an abelian Hadamard difference set in a group of order divisible by a prime p#1 (mod 4). Applying the Turyn composition theorem, one obtains a