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STEINER TRADES THAT GIVE RISE TO COMPLETELY DECOMPOSABLE LATIN INTERCHANGES 

Authors: Richard Bean a;  Diane Donovan a;  Abdollah Khodkar a; Anne Penfold Street a
Affiliation:   a Centre for Discrete Mathematics and Computing, Department of Mathematics, The University of Queensland, 4072, Australia.
DOI: 10.1080/00207160214654
Publication Frequency: 15 issues per year
Published in: journal International Journal of Computer Mathematics, Volume 79, Issue 12 2002 , pages 1273 - 1284
Number of References: 8
Formats available: PDF (English)
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Abstract

In this paper we focus on the representation of Steiner trades of volume less than or equal to nine and identify those for which the associated partial latin square can be decomposed into six disjoint latin interchanges.
Keywords: Steiner Triple Systems; Trades; Latin Squares; Latin Interchanges
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