Abstract
The arrangement graph, denoted by A/sub n,k/, is a generalization of the star graph. A recent work by S.Y. Hsieh et al. (1999) showed that when n-k/spl ges/4 and k=2 or n-k/spl ges/4+[k/2] and k/spl ges/3, A/sub n,k/ with k(n-k)-2 random edge faults, can embed a Hamiltonian cycle. In this paper, we generalize Hsieh et al. work by embedding a Hamiltonian path between arbitrary two distinct vertices of the same A/sub n,k/. To overcome the difficulty arising from random selection of the two end vertices, a new embedding method, based on a backtracking technique, is proposed. Our results can tolerate more edge faults than Hsieh et al. results as k/spl ges/7 and 7/spl les/n-k/spl les/3+[k/2], although embedding a Hamiltonian path between arbitrary two distinct vertices is more difficult than embedding a Hamiltonian cycle.
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