Three Edge-Disjoint Hamiltonian Cycles in Crossed Cubes with Applications to Fault-Tolerant Data Broadcasting
Kung-Jui Pai, Ro-Yu Wu, Sheng-Lung Peng and Jou-Ming Chang
The Journal of Supercomputing, Vol. 79, No. 4, (2023) 4126-4145.

The above article has been cited by the articles listed below.
  1. Kung-Jui Pai, Three edge-disjoint Hamiltonian cycles in folded locally twisted cubes and folded crossed cubes with applications to all-to-all broadcasting, Mathematics 11(15) (2023) 3384. (*)

  2. Weibei Fan, Xuanli Liu, Mengjie Lv, Hamiltonian cycle embedding with fault-tolerant edges and adaptive diagnosis in half hypercube, Journal of Supercomputing 80(4) (2024) 5654-5674. (*)

  3. Yunsong Zhang, Lantao You, Yuejuan Han, Rong Xiao, One-to-one node disjoint paths on divide-and-swap cubes, International Journal of Computer Mathematics: Computer Systems Theory 9(3) (2024) 183-201. (*)

  4. Shuai Liu, Yan Wang, Jianxi Fan, and Baolei Cheng, Edge-disjoint Hamiltonian cycles in balanced hypercubes with applications to fault-tolerant data broadcasting, International Journal of Foundations of Computer Science 36(1) (2025) 1-24. (*)

  5. Qi He, Yan Wang, Jianxi Fan, Baolei Cheng, Parallel construction of edge-independent spanning trees in complete Josephus cubes, The Journal of Supercomputing 81(1) (2025) 334. (*)

  6. Xiao-Yan Li, Jou-Ming Chang, LP-Star: embedding longest paths into star networks with large-scale missing edges under an emerging assessment model, IEEE Transactions on Emerging Topics in Computing.

Times cited: 5 (from Web of Science)