@article {IOPORT.06093186,
    author       = {Chang, Yanxun and Faro, Giovanni Lo and Tripodi, Antoinette},
    title        = {Three types of edge-switchable kite systems.},
    year         = {2011},
    journal      = {Ars Combinatoria},
    volume       = {100},
    issn         = {0381-7032},
    pages        = {79-96},
    publisher    = {Charles Babbage Research Centre, Winnipeg, MB},
    abstract     = {Summary: Informally, an $\epsilon $-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 $\epsilon $-edge switches are made to the subgraphs. This paper determines the spectrum of $\epsilon $-switchable $G$-design where $G$ is a kite (a triangle with an edge attached) and $\epsilon $ takes $t$-edge, $h$-edge and $l$-edge.},
    identifier   = {06093186},
}