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Families of locally separated Hamilton paths

Authors
Publication date
1 January 2017
Publisher
Wiley-Liss Inc.
Doi

    Abstract

    We improve by an exponential factor the lower bound of K¨orner and Muzi for the cardinality of the largest family of Hamilton paths in a complete graph of n vertices in which the union of any two paths has maximum degree 4. The improvement is through an explicit construction while the previous bound was obtained by a greedy algorithm. We solve a similar problem for permutations up to an exponential factor

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