It is proved in this paper that for any integer \(n \geq 100\), a \((v,n)\)-IODLS (incomplete orthogonal diagonal Latin squares) exists if and only if \(v \geq 3n+2\). Results for \(n=2\) are also mentioned.
Citation
B. Du. Orthogonal Diagonal Latin Squares with Orthogonal Diagonal Subsquares[J], Journal of Combinatorial Mathematics and Combinatorial Computing, Volume 015. 229-239. DOI: .
