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AVOIDING PARTIAL LATIN SQUARES SIMULTANEOUSLY

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Date Issued:
2011
Summary:
Chetwynd and Rhodes proved that 2 partial Latin squares of order 4k are avoidable given that k > 3240. We prove that 2 partial Latin squares of order 4k are avoidable for k > 42.
Title: AVOIDING PARTIAL LATIN SQUARES SIMULTANEOUSLY.
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Name(s): Berry, Hannah Marie, Author
Type of Resource: text
Date Issued: 2011
Publisher: University of West Florida
Language(s): English
Summary: Chetwynd and Rhodes proved that 2 partial Latin squares of order 4k are avoidable given that k > 3240. We prove that 2 partial Latin squares of order 4k are avoidable for k > 42.
Identifier: WFE0000253 (IID), uwf:60911 (fedora)
Note(s): 2011-05-01
M.S.
Department of Mathematics
Masters
Subject(s): avoiding partial Latin squares
Persistent Link to This Record: http://purl.flvc.org/uwf/fd/WFE0000253
Restrictions on Access: public
Use and Reproduction: http://rightsstatements.org/vocab/InC-EDU/1.0/
Host Institution: UWF

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