id: 05912566
dt: j
an: 05912566
au: Chelvam, T.Tamizh; Sattanathan, M.
ti: Subgroup complementary Cayley graph.
so: Int. J. Algebra 4, No. 21-24, 1051-1056 (2010).
py: 2010
pu: Hikari Ltd, Ruse
la: EN
cc: 
ut: Cayley graph; Hamiltonian graph; complete n-partite graph; planar graph
ci: 
li: http://www.m-hikari.com/ija/ija-2010/ija-21-24-2010/index.html
ab: Summary: Cayley graphs are graphs constructed out of a finite group $Γ$
    and its generating set $A$. Let $G$ be a group and let $H$ be a
    subgroup of $G$. The Cayley graph ($G, G - H$) is called the Subgroup
    Complementary Cayley graph and it is denoted by $\cal {SC}(G, H)$. In
    this paper, some graph theoretical properties of $\cal {SC}(G, H)$ are
    obtained and through which the structure of such graphs are analyzed.
rv: