Planar-Toroidal Decomposition of K12
Abstract
In 1978, Anderson and White asked whether there is a decomposition of K12 into two graphs, one planar and one toroidal. Using theoretical arguments and a computer search of all maximal planar graphs of order 12, we show that no such decomposition exists. We further show that if G is planar of order 12 and H⊂eqG is toroidal, then H has at least two fewer edges than G. A computer search found all 123 unique pairs (G,H) that make this an equality.
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