Let a tree 
be a subgraph of a cubic graph
. The graph excision 
is the graph resulting from removing the tree,
then merging the edges. For example, if in the Tutte
8-cage (left figure) the tree formed by the 6 interior points (middle figure)
is excised, the McGee graph (right figure) results.
Similarly, excising the Heawood graph gives the
Petersen graph, and excising the generalized
hexagon (i.e., the unique 12-cage graph) gives
the Balaban 11-cage (Biggs 1998).
The reverse of excision is insertion. Both operations are used in the analysis of cages.
The following table gives some cubic symmetric graphs with named edge-excised graphs, illustrated above.
| graph | edge-excised graph |
| utility graph | tetrahedral graph |
| cubical graph | 3-prism graph |
| Petersen graph | 4-Möbius ladder |
| Heawood graph | 12-cubic graph 84 |
| Möbius-Kantor graph | 14-cubic graph 503 |
| dodecahedral graph | cubic polyhedral graph Cp34 |
