Sai Zeng, Angran Xiao, et al.
CAD Computer Aided Design
Consider an undirected graph G=(V,E) with positive integer edge weights. Subramanian [11] established an upper bound of |V|4/6 on the number of minimum weight cycles. We present a new algorithm to enumerate all minimum weight cycles with a complexity of O(|V|3(|E|+|V|log|V|)). Using this algorithm, we derive the following upper bounds for the number of minimum weight cycles: if the minimum weight is even, the bound is |V|4/4, and if it is odd, the bound is |V|3/2. Notably, we improve Subramanian's bound by an order of magnitude when the minimum weight of a cycle is odd. Additionally, we demonstrate that these bounds are asymptotically tight.
Sai Zeng, Angran Xiao, et al.
CAD Computer Aided Design
Rafae Bhatti, Elisa Bertino, et al.
Communications of the ACM
Ruixiong Tian, Zhe Xiang, et al.
Qinghua Daxue Xuebao/Journal of Tsinghua University
Michael Ray, Yves C. Martin
Proceedings of SPIE - The International Society for Optical Engineering