Add to ORKGOn the structure of abelian groups admitting divisible difference sets. - In: Journal of combinatorial theory / A. 65. 1994. S. 202-21
Difference sets belong both to group theory and to combinatorics. Studying them requires tools from ...
AbstractKraemer has shown that every abelian group of order 22d + 2 with exponent less than 22d + 3 ...
We study the induced structure on definable groups in existentially closed difference fields. If G i...
AbstractWe prove an exponent bound for relative difference sets corresponding to symmetric nets. We ...
AbstractWe investigate proper (m, n, k, λ1, λ2)-divisible difference sets D in an abelian group G ad...
AbstractWe investigate (m, n, k, λ1, λ2)-divisible difference sets in an abelian group admitting −1 ...
This thesis describes properties of Abelian groups, and develops a study of the properties of divisi...
AbstractUsing the representation theory of groups and the theory of cyclotomic fields, in this paper...
Using the representation theory of groups and the theory of cyclotomic fields, in this paper we obta...
AbstractA difference set D in a group G is called antisymmetric if D ⌣ (−D) = π and D ⌣ (−D) ⌣ (0) =...
Examples of difference sets are given for large classes of abelian groups of order 22d + 2. This fil...
AbstractUsing the representation theory of groups and the theory of cyclotomic fields, in this paper...
AbstractWe present a recursive construction for difference sets which unifies the Hadamard, McFarlan...
Xiang, QingDifference sets exist at the intersection of algebra and combinatorics, and are motivated...
AbstractWe present a construction of Hadamard difference sets in abelian groups of order 4p4n, whose...
Difference sets belong both to group theory and to combinatorics. Studying them requires tools from ...
AbstractKraemer has shown that every abelian group of order 22d + 2 with exponent less than 22d + 3 ...
We study the induced structure on definable groups in existentially closed difference fields. If G i...
AbstractWe prove an exponent bound for relative difference sets corresponding to symmetric nets. We ...
AbstractWe investigate proper (m, n, k, λ1, λ2)-divisible difference sets D in an abelian group G ad...
AbstractWe investigate (m, n, k, λ1, λ2)-divisible difference sets in an abelian group admitting −1 ...
This thesis describes properties of Abelian groups, and develops a study of the properties of divisi...
AbstractUsing the representation theory of groups and the theory of cyclotomic fields, in this paper...
Using the representation theory of groups and the theory of cyclotomic fields, in this paper we obta...
AbstractA difference set D in a group G is called antisymmetric if D ⌣ (−D) = π and D ⌣ (−D) ⌣ (0) =...
Examples of difference sets are given for large classes of abelian groups of order 22d + 2. This fil...
AbstractUsing the representation theory of groups and the theory of cyclotomic fields, in this paper...
AbstractWe present a recursive construction for difference sets which unifies the Hadamard, McFarlan...
Xiang, QingDifference sets exist at the intersection of algebra and combinatorics, and are motivated...
AbstractWe present a construction of Hadamard difference sets in abelian groups of order 4p4n, whose...
Difference sets belong both to group theory and to combinatorics. Studying them requires tools from ...
AbstractKraemer has shown that every abelian group of order 22d + 2 with exponent less than 22d + 3 ...
We study the induced structure on definable groups in existentially closed difference fields. If G i...