A simple formula for the number of spanning trees of line graphs期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

A simple formula for the number of spanning trees of line graphs

Abstract:	Suppose $urn:x-wiley:03649024:media:jgt22212:jgt22212-math-0001$ is a loopless graph and $urn:x-wiley:03649024:media:jgt22212:jgt22212-math-0002$ is the graph obtained from G by subdividing each of its edges k ( $urn:x-wiley:03649024:media:jgt22212:jgt22212-math-0003$ ) times. Let $urn:x-wiley:03649024:media:jgt22212:jgt22212-math-0004$ be the set of all spanning trees of G, $urn:x-wiley:03649024:media:jgt22212:jgt22212-math-0005$ be the line graph of the graph $urn:x-wiley:03649024:media:jgt22212:jgt22212-math-0006$ and $urn:x-wiley:03649024:media:jgt22212:jgt22212-math-0007$ be the number of spanning trees of $urn:x-wiley:03649024:media:jgt22212:jgt22212-math-0008$ . By using techniques from electrical networks, we first obtain the following simple formula: Then we find it is in fact equivalent to a complicated formula obtained recently using combinatorial techniques in [F. M. Dong and W. G. Yan, Expression for the number of spanning trees of line graphs of arbitrary connected graphs, J. Graph Theory. 85 (2017) 74–93].

Keywords:	electrical networks line graphs mesh‐star transformation spanning trees subdivision 05C30 05C76 05C05 05C22