New families of atomic Latin squares and perfect 1-factorisations
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Bryant, Darryn; Maenhaut, Barbara; Wanless, Ian
Description
A perfect 1 -factorisation of a graph G is a decomposition of G into edge disjoint 1 -factors such that the union of any two of the factors is a Hamiltonian cycle. Let p ≥ 11 be prime. We demonstrate the existence of two non-isomorphic perfect 1-factori
Collections | ANU Research Publications |
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Date published: | 2006 |
Type: | Journal article |
URI: | http://hdl.handle.net/1885/17230 |
Source: | Journal of Combinatorial Theory Series A |
DOI: | 10.1016/j.jcta.2005.05.003 |
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