Dave Morris, Joy Morris, David P. Moulton
Published 2003-09-02, updated 2004-02-06Version 2
If X is any connected Cayley graph on any finite abelian group, we determine precisely which flows on X can be written as a sum of hamiltonian cycles. (This answers a question of Brian Alspach.) In particular, if the degree of X is at least 5, and X has an even number of vertices, then the flows that can be so written are precisely the even flows, that is, the flows f, such that the sum of the edge-flows of f is divisible by 2. On the other hand, there are examples of degree 4 in which not all even flows can be written as a sum of hamiltonian cycles. Analogous results were already known, from work of Alspach, Locke, and Witte, for the case where X is cubic, or has an odd number of vertices.
Comments: Latex2e file, 68 pages, minor errors corrected and title slightly changed
A method to determine algebraically integral Cayley digraphs on finite Abelian group
Some new results about a conjecture by Brian Alspach
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