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<rdf:RDF xmlns:rdf="http://www.w3.org/1999/02/22-rdf-syntax-ns#" xmlns:dc="http://purl.org/dc/elements/1.1/"><rdf:Description rdf:about="https://repozitorij.upr.si/IzpisGradiva.php?id=4414"><dc:title>Distance-regular Cayley graphs on dihedral groups</dc:title><dc:creator>Miklavič,	Štefko	(Avtor)
	</dc:creator><dc:creator>Potočnik,	Primož	(Avtor)
	</dc:creator><dc:subject>mathematics</dc:subject><dc:subject>grah theory</dc:subject><dc:subject>distance-regular graph</dc:subject><dc:subject>distance-transitive graph</dc:subject><dc:subject>Cayley graph</dc:subject><dc:subject>dihedral group</dc:subject><dc:subject>dihedrant</dc:subject><dc:subject>difference set</dc:subject><dc:description>The main result of this article is a classification of distance-regular Cayley graphs on dihedral groups. There exist four obvious families of such graphs, which are called trivial. These are: complete graphs, complete bipartite graphs, complete bipartite graphs with the edges of a 1-factor removed, and cycles. It is proved that every non-trivial distance-regular Cayley graph on a dihedral group is bipartite, non-antipodal, has diameter 3 and arises either from a cyclic di#erence set, or possibly (if any such exists) from a dihedral difference set satisfying some additional conditions. Finally, all distance-transitive Cayley graphs on dihedral groups are determined. It transpires that a Cayley graph on a dihedral group is distance-transitive if and only if it is trivial, or isomorphic to the incidence or to the non-incidence graph of a projective space ▫$\mathrm{PG}_{d-1} (d,q)$▫, ▫$d \ge 2$▫, or the unique pair of complementary symmetric designs on 11 vertices.</dc:description><dc:date>2005</dc:date><dc:date>2015-07-10 11:46:05</dc:date><dc:type>Delo ni kategorizirano</dc:type><dc:identifier>4414</dc:identifier><dc:language>sl</dc:language></rdf:Description></rdf:RDF>