id: 06093186
dt: j
an: 06093186
au: Chang, Yanxun; Faro, Giovanni Lo; Tripodi, Antoinette
ti: Three types of edge-switchable kite systems.
so: Ars Comb. 100, 79-96 (2011).
py: 2011
pu: Charles Babbage Research Centre, Winnipeg, MB
la: EN
cc: 
ut: complete multipartite graph; $G$-design; switchable kite system; group
    divisible design
ci: 
li: 
ab: Summary: Informally, an $ϵ$-switchable $G$-design is a decomposition of
    the complete graph into subgraphs of isomorphic copies of $G$ which
    have the property that they remain a $G$-decomposition when $ϵ$-edge
    switches are made to the subgraphs. This paper determines the spectrum
    of $ϵ$-switchable $G$-design where $G$ is a kite (a triangle with an
    edge attached) and $ϵ$ takes $t$-edge, $h$-edge and $l$-edge.
rv: