Optimal edge fault-tolerant-prescribed hamiltonian laceability of balanced hypercubes
Abstract
Aims: Try to prove the n-dimensional balanced hypercube BHn is (2n-2)-fault-tolerant-prescribed hamiltonian laceability. Methods: Prove it by induction on n. It is known that the assertation holds for n∈\1,2\. Assume it holds for n-1 and prove it holds for n, where n≥ 3. If there are 2n-3 faulty links and they are all incident with a common node, then we choose some dimension such that there is one or two faulty links and no prescribed link in this dimension; Otherwise, we choose some dimension such that the total number of faulty links and prescribed links does not exceed 1. No matter which case, partition BHn into 4 disjoint copies of BHn-1 along the above chosen dimension. Results: On the basis of the above partition of BHn, in this manuscript, we complete the proof for the case that there is at most one faulty link in the above chosen dimension.
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