On the minimum number of entries in a pair of maximal orthogonal partial Latin squares It is shown that if $F$ denotes the number of filled cells in a superimposed pair of maximal orthogonal partial Latin squares of order $n$, then $F\ge n^2/3$. This resolves a conjecture raised in an e...

📢 New publication 'On the minimum number of entries in a pair of maximal orthogonal partial #LatinSquares' by Diane Donovan, Mike Grannell and Emine Şule Yazıcı in arXiv 🧮🧪

doi.org/10.48550/arX...

Further Results on Latin Squares with Disjoint Subsquares using Rational Outline Squares | The Electronic Journal of Combinatorics

📢 New publication 'Further Results on Latin Squares with Disjoint Subsquares using Rational Outline Squares' by Tara Kemp and James Lefevre in The Electronic Journal of Combinatorics 🧮🧪

#LatinSquares #subsquares

doi.org/10.37236/14201

📺 The 5th #MOSS talk is now available on the #EMS YouTube channel!

Prof. #Richard #Montgomery (University of Warwick, UK) discussing on #LatinSquares via #GraphTheory.

#EMYA #EMS #Maths

➡️ Watch the video: www.youtube.com/watch?v=RLkh...