Completely independent spanning trees in the hypercube
Abstract
We say two spanning trees of a graph are completely independent if their edge sets are disjoint, and for each pair of vertices, the paths between them in each spanning tree do not have any other vertex in common. Pai and Chang constructed two such spanning trees in the hypercube Qn for sufficiently large n, while Kandekar and Mane recently showed there are 3 pairwise completely independent spanning trees in hypercubes Qn for sufficiently large n. We prove that for each k, there exist k completely independent spanning trees in Qn for sufficiently large n. In fact, we show that there are (112+o(1))n spanning trees in Qn, each with diameter (2+o(1))n. As the minimal diameter of any spanning tree of Qn is 2n-1, this diameter is asymptotically optimal. We prove a similar result for the powers Hn of any fixed graph H.
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