Jernej Azarija, Riste Škrekovski, Department of Mathematics, University of Ljubljana, Jadranska 21, 1000 Ljubljana, Slovenia, e-mail: jernej.azarija@ gmail.com, skrekovski@gmail.com
Abstract: Let $\alpha(n)$ be the least number $k$ for which there exists a simple graph with $k$ vertices having precisely $n \geq3$ spanning trees. Similarly, define $\beta(n)$ as the least number $k$ for which there exists a simple graph with $k$ edges having precisely $n \geq3$ spanning trees. As an $n$-cycle has exactly $n$ spanning trees, it follows that $\alpha(n),\beta(n) \leq n$. In this paper, we show that $\alpha(n) \leq\frac13(n+4)$ and $\beta(n) \leq\frac13(n+7) $ if and only if $n \notin\{3,4,5,6,7,9,10,13,18,22\}$, which is a subset of Euler's idoneal numbers. Moreover, if $n \not\equiv2 \pmod3$ and $n \not= 25$ we show that $\alpha(n) \leq\frac14(n+9)$ and $\beta(n) \leq\frac14(n+13).$ This improves some previously estabilished bounds.
Keywords: number of spanning trees, extremal graph
Classification (MSC 2010): 05C35, 05C05
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