0 KB250 KB23 KB200820252013Hujdurović, Ademirštevilka:1letnik:6str. 147-154COBISSID:1024427348ISSN:1855-3966URN:URN:NBN:SI:doc-N0GDHVJUenDruštvo matematikov, fizikov in astronomov SlovenijeArs mathematica contemporaneaarc-transitivecirculantquasi m-Cayley graphteorija grafovQuasi m-Cayley circulants|A graph ?$\Gamma$? is called a quasi ?$m$?-Cayley graph on a group ?$G$? if there exists a vertex ?$\infty \in V(\Gamma)$? and a subgroup ?$G$? of the vertex stabilizer ?$\text{Aut}(\Gamma)_\infty$? of the vertex ?$\infty$? in the full automorphism group ?$\text{Aut}(\Gamma)$? of ?$\Gamma$?, such that ?$G$? acts semiregularly on ?$V(\Gamma) \setminus \{\infty\}$? with ?$m$? orbits. If the vertex ?$\infty$? is adjacent to only one orbit of ?$G$? on ?$V(\Gamma) \setminus \{\infty\}$?, then ?$\Gamma$? is called a strongly quasi ?$m$?-Cayley graph on ?$G$? .In this paper complete classifications of quasi 2-Cayley, quasi 3-Cayley and strongly quasi 4-Cayley connected circulants are givenTEXTznanstveno časopisjejournalsSlovenian National E-content AggregatorNational and University Library of SloveniaUniverza na Primorskem, Fakulteta za naravoslovje, matematiko in informacijske tehnologije