Abstract
The set R of relevant cycles of a graph G is the union of its minimum cycle bases. We introduce a partition of R such that each cycle in a class W can be expressed as a sum of other cycles in W and shorter cycles. It is shown that each minimum cycle basis contains the same number of representatives of a given class W. This result is used to derive upper and lower bounds on the number of distinct minimum cycle bases. Finally, we give a polynomial-time algorithm to compute this partition.
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Gleiss, P. M., Leydold, J., & Stadler, P. F. (2000). Interchangeability of relevant cycles in graphs. Electronic Journal of Combinatorics, 7(1 R), 1–16. https://doi.org/10.37236/1494
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