On disjoint (v,k,k-1) difference families

A disjoint ( v , k , k - 1 ) difference family in an additive group G is a partition of G \ { 0 } into sets of size k whose lists of differences cover, altogether, every non-zero element of G exactly k - 1 times. The main purpose of this paper is to get the literature on this topic in order, since s...

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Veröffentlicht in:	Designs, codes, and cryptography codes, and cryptography, 2019-04, Vol.87 (4), p.745-755
1. Verfasser:	Buratti, Marco
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Sprache:	eng
Schlagworte:	Circuits Coding and Information Theory Computer Science Cryptology Data Structures and Information Theory Discrete Mathematics in Computer Science Fibonacci numbers Information and Communication Sequences Special Issue: Finite Geometries
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description	A disjoint ( v , k , k - 1 ) difference family in an additive group G is a partition of G \ { 0 } into sets of size k whose lists of differences cover, altogether, every non-zero element of G exactly k - 1 times. The main purpose of this paper is to get the literature on this topic in order, since some authors seem to be unaware of each other’s work. We show, for instance, that a couple of heavy constructions recently presented as new, had been given in several equivalent forms over the last forty years. We also show that they can be quickly derived from a general nearring theory result which probably passed unnoticed by design theorists and that we restate and reprove, more simply, in terms of differences . This result can be exploited to get many infinite classes of disjoint ( v , k , k - 1 ) difference families; here, as an example, we present an infinite class coming from the Fibonacci sequence. Finally, we will prove that if all prime factors of v are congruent to 1 modulo k , then there exists a disjoint ( v , k , k - 1 ) difference family in every group, even non-abelian, of order v .
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This result can be exploited to get many infinite classes of disjoint ( v , k , k - 1 ) difference families; here, as an example, we present an infinite class coming from the Fibonacci sequence. Finally, we will prove that if all prime factors of v are congruent to 1 modulo k , then there exists a disjoint ( v , k , k - 1 ) difference family in every group, even non-abelian, of order v .</abstract><cop>New York</cop><pub>Springer US</pub><doi>10.1007/s10623-018-0511-4</doi><tpages>11</tpages><orcidid>https://orcid.org/0000-0003-1140-2251</orcidid></addata></record>
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title	On disjoint (v,k,k-1) difference families
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