We show that a group with all Sylow subgroups cyclic (other than Z(4)) cannot contain a normal semiregular relative difference set (RDSs). We also give a new proof that dihedral groups cannot contain (normal) semiregular RDSs either
In this note, we show that there is no (945, 177, 33)-difference set in any group G of order 945 wit...
relative difference sets, recursive, building sets, characters We recursively construct a new family...
AbstractWe modify and generalize the construction by McFarland (1973) in two different ways to const...
Let G be a finite group other than 4 and suppose that G contains a semiregular relative difference s...
AbstractIn this article, a classification of semiregular relative difference sets in non-abelian 2-g...
AbstractIn this article, we show that a (2n,2,2n,n) relative difference set in a group G of order 4n...
In this paper, we give a characterization of a group G which contains a semiregular relative differe...
AbstractIn this paper, we give a characterization of a group G which contains a semiregular relative...
We call a group G with subgroups G(1),G(2) such that G-G(1)G(2) and both N = G(1) boolean AND G(2) a...
We give two constructions for semi-regular relative difference sets (RDSs) in groups whose order is ...
Motivated by a connection between semi-regular relative difference sets and mutually unbiased bases,...
AbstractMotivated by a connection between semi-regular relative difference sets and mutually unbiase...
An n-subsetD of a group G of order n2−1 is called an affine difference set of G relative to a normal...
AbstractWe present a recursive construction for difference sets which unifies the Hadamard, McFarlan...
In this note, we consider relative difference sets with the parameter (m, 2, m - 1, m-2/2) in a grou...
In this note, we show that there is no (945, 177, 33)-difference set in any group G of order 945 wit...
relative difference sets, recursive, building sets, characters We recursively construct a new family...
AbstractWe modify and generalize the construction by McFarland (1973) in two different ways to const...
Let G be a finite group other than 4 and suppose that G contains a semiregular relative difference s...
AbstractIn this article, a classification of semiregular relative difference sets in non-abelian 2-g...
AbstractIn this article, we show that a (2n,2,2n,n) relative difference set in a group G of order 4n...
In this paper, we give a characterization of a group G which contains a semiregular relative differe...
AbstractIn this paper, we give a characterization of a group G which contains a semiregular relative...
We call a group G with subgroups G(1),G(2) such that G-G(1)G(2) and both N = G(1) boolean AND G(2) a...
We give two constructions for semi-regular relative difference sets (RDSs) in groups whose order is ...
Motivated by a connection between semi-regular relative difference sets and mutually unbiased bases,...
AbstractMotivated by a connection between semi-regular relative difference sets and mutually unbiase...
An n-subsetD of a group G of order n2−1 is called an affine difference set of G relative to a normal...
AbstractWe present a recursive construction for difference sets which unifies the Hadamard, McFarlan...
In this note, we consider relative difference sets with the parameter (m, 2, m - 1, m-2/2) in a grou...
In this note, we show that there is no (945, 177, 33)-difference set in any group G of order 945 wit...
relative difference sets, recursive, building sets, characters We recursively construct a new family...
AbstractWe modify and generalize the construction by McFarland (1973) in two different ways to const...
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