Distance-transitive graphs admit semiregular automorphisms
Povzetek
A distance-transitive graph is a graph in which for every two ordered pairs ofvertices ▫$(u,v)$▫ and ▫$(u',v')$▫ such that the distance between ▫$u$▫ and ▫$v$▫ is equal to the distance between ▫$u'$▫ and ▫$v'$▫ there exists an automorphism of the graph mapping ▫$u$▫ to ▫$u'$▫ and ▫$v$▫ to ▫$v'$▫. A semiregular element of a permutation group is anon-identity element having all cycles of equal length in its cycle decomposition. It is shown that every distance-transitive graph admits a semiregular automorphism.
Ključne besede
distance-transitive graph;vertex-transitive graph;semiregular automorphism;permutation group;
Podatki
| Jezik: | Angleški jezik |
|---|---|
| Leto izida: | 2010 |
| Tipologija: | 1.01 - Izvirni znanstveni članek |
| Organizacija: | UL FMF - Fakulteta za matematiko in fiziko |
| UDK: | 519.17 |
| COBISS: |
1024085332
|
| ISSN: | 0195-6698 |
| Št. ogledov: | 3220 |
| Št. prenosov: | 98 |
| Ocena: | 0 (0 glasov) |
| Metapodatki: |
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Ostali podatki
| Sekundarni jezik: | Angleški jezik |
|---|---|
| Vrsta dela (COBISS): | Delo ni kategorizirano |
| Strani: | str. 25-28 |
| Letnik: | ǂVol. ǂ31 |
| Zvezek: | ǂno. ǂ1 |
| Čas izdaje: | 2010 |
| DOI: | 10.1016/j.ejc.2009.03.018 |
| ID: | 1477156 |
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