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On Completing Latin Rectangles

Published online by Cambridge University Press:  20 November 2018

Charles C. Lindner*
Affiliation:
Auburn University, Auburn, Alabama
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By an (incomplete) r × s latin rectangle is meant an r × s array such that (in some subset of the rs cells of the array) each of the cells is occupied by an integer from the set 1, 2, …, s and such that no integer from the set 1,2, …, s occurs in any row or column more than once. This definition requires that rs. If r=s we will replace the word rectangle by square. It is easy to see that for any n≧2 there is an incomplete n × 2n latin rectangle with 2n cells occupied which cannot be completed to a n × 2n latin rectangle. In this paper we prove the following theorem.

Theorem 1. An incomplete n × 2n latin rectangle with 2n—1 cells occupied can be completed to a n × 2n latin rectangle.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1970

References

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