Asymptotic enumeration of perfect matchings in $m$-barrel fullerene graphs
A connected planar cubic graph is called an $m$-barrel fullerene and denoted by $F(m,k)$, if it has the following structure: The first circle is an $m$-gon. Then $m$-gon is bounded by $m$ pentagons. After that we have additional k layers of hexagons. At the last circle $m$-pentagons connected to the...
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| Zusammenfassung: | A connected planar cubic graph is called an $m$-barrel fullerene and denoted
by $F(m,k)$, if it has the following structure: The first circle is an $m$-gon.
Then $m$-gon is bounded by $m$ pentagons. After that we have additional k
layers of hexagons. At the last circle $m$-pentagons connected to the second
$m$-gon. In this paper we asymptotically count by two different methods the
number of perfect matchings in $m$-barrel fullerene graphs, as the number of
hexagonal layers is large, and show that the results are equal. |
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| DOI: | 10.48550/arxiv.1710.05156 |