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The number of spanning trees in a class of double fixed-step loop networks. (English) Zbl 1155.05032

Summary: We develop a method to count the number of spanning trees in certain classes of double fixed-step loop networks with nonconstant steps. More specifically our technique finds the number of spanning trees in \(\vec C_n^{p,q}\), the double fixed-step loop network with \(n\) vertices and jumps of size \(p\) and \(q\), when \(n = d_{1}m\), and \(q = d_{2}m + p\) where \(d_{1}\), \(d_{2}\), and \(p\) are arbitrary parameters and \(m\) is a variable.

MSC:

05C20 Directed graphs (digraphs), tournaments
05C05 Trees
05C30 Enumeration in graph theory
68R10 Graph theory (including graph drawing) in computer science
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References:

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