HIGHLIGHTS
- What: The authors show that τ3 (AQn ) = 2n - 3. which attains the upper bound of τ3 (G) given by Hager for G = AQn.
- Who: Mathematics Subject Classification et al. from the University of Pune have published the article: Pendant 3-Tree Connectivity of Augmented Cubes, in the Journal: (JOURNAL)
SUMMARY
Choudum and Sunita showed that the augmented cube of dimension n contains two edge-disjoint complete binary trees on 2n - 1 vertices both rooted at the same vertex, two edge-disjoint spanning binomial trees, and all the k-cycles, 3 ≤ k . . .
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