arXiv:math/0110073 Abstract

arXiv:math/0110073 [math.CO]Abstract References Reviews Resources

Hamiltonian Paths in Cartesian Powers of Directed Cycles

David Austin, Heather Gavlas, Dave Witte

Published 2001-10-05Version 1

The vertex set of the kth cartesian power of a directed cycle of length m can be naturally identified with the set of k-tuples of integers modulo m. For any two vertices v and w of this graph, it is easy to see that if there is a hamiltonian path from v to w, then the sum of the coordinates of v is congruent, modulo m, to one more than the sum of the coordinates of w. We prove the converse, unless k = 2 and m is odd.

Comments: 8 pages, no figures

Categories: math.CO

Subjects: 05C45, 05C25

Keywords: hamiltonian path, directed cycle, kth cartesian power, integers modulo, vertex set

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