An n-subsetD of a group G of order n2−1 is called an affine difference set of G relative to a normal subgroup N of G of order n−1 if the list of differences d1d2-1 (d1, d2 ∈ D, d1 ≠ d2) contain search element of G-N exactly once and no element of N. It is a well-known conjecture that if D is an affine difference set in an abelian group G, then for every prime p, the Sylow p-subgroup of G is cyclic. In Arasu and Pott [1], it was shown that the above conjecture is true when p = 2. In this paper we give some conditions under which the Sylow p-subgroup of G is cyclic
Let D be an affine difference set of order n in an abelian group G relative to a subgroup N. We den...
For a group theorist, Sylow’s Theorem is such a basic tool, and so fundamental, that it is used almo...
AbstractLet D be an (m,n;k;λ1,λ2)-group divisible difference set (GDDS) of a group G, written additi...
AbstractIn this article, we show that a (2n,2,2n,n) relative difference set in a group G of order 4n...
AbstractA McFarland difference set is a difference set with parameters (νv, k, λ) = (qd + 1(qd + qd ...
We prove the following theorems. Theorem A. Let G be a group of order 160 satisfying one of the fol...
AbstractWe present a recursive construction for difference sets which unifies the Hadamard, McFarlan...
AbstractLetDbe a (v,k,λ)-difference set in a groupG. Assume thatGhas a normal subgroupNsuch thatG/Ni...
Eric Lander conjectured that if G is an abelian group of order $v$ containing a difference set of or...
Let G be a finite group other than 4 and suppose that G contains a semiregular relative difference s...
The following theorem is proved: Theorem Let G be a finite group, P a Sylow p-subgroup of G, p odd....
Let D be an affine difference set of order n in an abelian group G relative to a subgroup N. Set H^^...
AbstractGiven a set Γ of permutations of an n-set, let G be the group of permutations generated by Γ...
We show that a group with all Sylow subgroups cyclic (other than Z(4)) cannot contain a normal semir...
AbstractWe show that under the self-conjugacy condition a McFarland difference set withp=2 andf⩾2 in...
Let D be an affine difference set of order n in an abelian group G relative to a subgroup N. We den...
For a group theorist, Sylow’s Theorem is such a basic tool, and so fundamental, that it is used almo...
AbstractLet D be an (m,n;k;λ1,λ2)-group divisible difference set (GDDS) of a group G, written additi...
AbstractIn this article, we show that a (2n,2,2n,n) relative difference set in a group G of order 4n...
AbstractA McFarland difference set is a difference set with parameters (νv, k, λ) = (qd + 1(qd + qd ...
We prove the following theorems. Theorem A. Let G be a group of order 160 satisfying one of the fol...
AbstractWe present a recursive construction for difference sets which unifies the Hadamard, McFarlan...
AbstractLetDbe a (v,k,λ)-difference set in a groupG. Assume thatGhas a normal subgroupNsuch thatG/Ni...
Eric Lander conjectured that if G is an abelian group of order $v$ containing a difference set of or...
Let G be a finite group other than 4 and suppose that G contains a semiregular relative difference s...
The following theorem is proved: Theorem Let G be a finite group, P a Sylow p-subgroup of G, p odd....
Let D be an affine difference set of order n in an abelian group G relative to a subgroup N. Set H^^...
AbstractGiven a set Γ of permutations of an n-set, let G be the group of permutations generated by Γ...
We show that a group with all Sylow subgroups cyclic (other than Z(4)) cannot contain a normal semir...
AbstractWe show that under the self-conjugacy condition a McFarland difference set withp=2 andf⩾2 in...
Let D be an affine difference set of order n in an abelian group G relative to a subgroup N. We den...
For a group theorist, Sylow’s Theorem is such a basic tool, and so fundamental, that it is used almo...
AbstractLet D be an (m,n;k;λ1,λ2)-group divisible difference set (GDDS) of a group G, written additi...
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