We give a short proof of a result of Jord\'an and Tanigawa that a 4-connected graph which has a spanning planar triangulation as a proper subgraph is generically globally rigid in $\real^3$. Our proof is based on a new sufficient condition for the so called vertex splitting operation to preserve generic global rigidity in $\real^d$.
Bibtex entry:
AUTHOR | = | {Jackson, Bill}, |
TITLE | = | {Vertex Splitting, Coincident Realisations and Global Rigidity of Braced Triangulations (A revised version is available as TR-2020-17)}, |
NOTE | = | {{\tt egres.elte.hu}}, |
INSTITUTION | = | {Egerv{\'a}ry Research Group, Budapest}, |
YEAR | = | {2020}, |
NUMBER | = | {TR-2020-02} |