At least half of the leapfrog fullerene graphs have exponentially many Hamilton cycles
Abstract
A fullerene graph is a 3-connected cubic planar graph with pentagonal and hexagonal faces. The leapfrog transformation of a planar graph produces the trucation of the dual of the given graph. A fullerene graph is leapfrog if it can be obtained from another fullerene graph by the leapfrog transformation. We prove that leapfrog fullerene graphs on n=12k-6 vertices have at least 2k Hamilton cycles.
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