AbstractMotivated by a question about uniform dessins d’enfants, it is conjectured that every cyclic planar difference set of prime power order m≠4 can be cyclically ordered such that the difference of every pair of neighbouring elements is coprime to the module v≔m2+m+1. We prove that this is the case whenever the number ω(v) of different prime divisors of v is less than or equal to 3. To achieve this we consider a graph related to the difference set and show that it is Hamiltonian
AbstractWith the exception of two (21, 5, 1) difference sets quoted in L. D. Baumert's 1971 survey, ...
Let D be an abelian difference set for a projective plane ∏ of order n. Then -D is an oval of ∏. Usi...
The coprime commutators γj∗ and δj∗ were recently introduced as a tool to study properties of finite...
AbstractMotivated by a question about uniform dessins d’enfants, it is conjectured that every cyclic...
A planar cyclic difference set of order n is an (n + 1)-subset D of the integers modulo n2+n+1 su...
Difference systems of sets (DSS) are combinatorial configurations that arise in connection with code...
AbstractDifference systems of sets (DSS) are combinatorial configurations that arise in connection w...
The Prime Power Conjecture (PPC) states that abelian planar difference sets of order n exist only fo...
A family F of triplets of a set X is a cyclic order if the following axioms are satisfied: (a, b, c)...
Let 0 be a cyclic difference list. We prove two theorems on the p-divisibility of the parameters of ...
AbstractThe existence of a cyclic affine plane implies the existence of a Paley type difference set....
In this paper we describe an exhaustive search for all cyclic differ-ence sets with parameters (v, k...
A subset $S = \{s_1, \ldots, s_k\} \subseteq \mathbb{Z}_n$ is called a {\it cyclic difference set mo...
By modifying the constructions in [10] and [15], we construct a family of cyclic ((q 3k − 1)/(q − ...
AbstractLet D be a planar cyclic difference set with 0 ∈D. Krasikov and Schönheim proposed in [2] th...
AbstractWith the exception of two (21, 5, 1) difference sets quoted in L. D. Baumert's 1971 survey, ...
Let D be an abelian difference set for a projective plane ∏ of order n. Then -D is an oval of ∏. Usi...
The coprime commutators γj∗ and δj∗ were recently introduced as a tool to study properties of finite...
AbstractMotivated by a question about uniform dessins d’enfants, it is conjectured that every cyclic...
A planar cyclic difference set of order n is an (n + 1)-subset D of the integers modulo n2+n+1 su...
Difference systems of sets (DSS) are combinatorial configurations that arise in connection with code...
AbstractDifference systems of sets (DSS) are combinatorial configurations that arise in connection w...
The Prime Power Conjecture (PPC) states that abelian planar difference sets of order n exist only fo...
A family F of triplets of a set X is a cyclic order if the following axioms are satisfied: (a, b, c)...
Let 0 be a cyclic difference list. We prove two theorems on the p-divisibility of the parameters of ...
AbstractThe existence of a cyclic affine plane implies the existence of a Paley type difference set....
In this paper we describe an exhaustive search for all cyclic differ-ence sets with parameters (v, k...
A subset $S = \{s_1, \ldots, s_k\} \subseteq \mathbb{Z}_n$ is called a {\it cyclic difference set mo...
By modifying the constructions in [10] and [15], we construct a family of cyclic ((q 3k − 1)/(q − ...
AbstractLet D be a planar cyclic difference set with 0 ∈D. Krasikov and Schönheim proposed in [2] th...
AbstractWith the exception of two (21, 5, 1) difference sets quoted in L. D. Baumert's 1971 survey, ...
Let D be an abelian difference set for a projective plane ∏ of order n. Then -D is an oval of ∏. Usi...
The coprime commutators γj∗ and δj∗ were recently introduced as a tool to study properties of finite...
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