- OPUS Home
- →
- Math & Computer Science
- →
- Faculty Research and Publications
- →
- Morris, Joy
- →
- View Item
JavaScript is disabled for your browser. Some features of this site may not work without it.
Toida's conjecture is true
Share :
Date:
2002
Keywords
:
Graph
;
Isomorphic
;
Automorphism
;
Toida's conjecture
;
Zibin's conjecture
;
Caley
;
Digraphs
;
Isomorphisms (Mathematics)
;
Graph theory
;
Group theory
;
Automorphisms
;
Combinatorial analysis
;
Caley graphs
Abstract:
Let S be a subset of the units in Zn. Let Γ be a circulant graph of order n (a Cayley graph of Zn) such that if ij ∈ E(Γ), then i − j (mod n) ∈ S. Toida conjectured that if Γ0 is another circulant graph of order n, then Γ and Γ 0 are isomorphic if and only if they are isomorphic by a group automorphism of Zn. In this paper, we prove that Toida’s conjecture is true. We further prove that Toida’s conjecture implies Zibin’s conjecture, a generalization of Toida’s conjecture.
Description:
Sherpa Romeo green journal: open access
