A polynomial-time algorithm to find the shortest cycle basis of a graph
SIAM Journal on Computing
On finding a cycle basis with a shortest maximal cycle
Information Processing Letters
The zoo of tree spanner problems
Discrete Applied Mathematics
Survey: Cycle bases in graphs characterization, algorithms, complexity, and applications
Computer Science Review
Hi-index | 0.89 |
An undirected biconnected graph G with nonnegative integer lengths on the edges is given. The problem we consider is that of finding a cycle basis B of G such that the length of the longest cycle included in B is the smallest among all cycle bases of G. We first observe that Horton's algorithm [SIAM J. Comput. 16 (2) (1987) 358-366] provides a fast solution of the problem that extends the one given by Chickering et al. [Inform. Process. Lett. 54 (1995) 55-58] for uniform graphs. On the other hand we show that, if the basis is required to be fundamental, then the problem is NP-hard and cannot be approximated within 2 - ε, ∀ε 0, even with uniform lengths, unless P = NP. This problem remains NP-hard even restricted to the class of complete graphs; in this case it cannot be approximated within 13/11 - ε, ∀ε 0, unless P = NP; it is instead approximable within 2 in general, and within 3/2 if the triangle inequality holds.