Embeddings of generalized Latin squares in finite groups

Let n be a positive integer. A generalized Latin square of order n is an matrix such that the elements in each row and each column are distinct. The square is said to be commutative if the matrix is symmetric. Given , we show that for any , there exists a commutative generalized Latin square of orde...

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Bibliographic Details
Main Authors:	Chen, H.V., Chin, A.Y.M.
Format:	Article
Published:	2015
Subjects:	Q Science (General) QA Mathematics

Embeddings of generalized Latin squares in finite groups

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