Litcius/Paper detail

Large deviations in random latin squares

Matthew Kwan, Ashwin Sah, Mehtaab Sawhney

2022Bulletin of the London Mathematical Society13 citationsDOIOpen Access PDF

Abstract

In this note, we study large deviations of the number 𝐍 of intercalates ( 2Γ—2 combinatorial subsquares which are themselves Latin squares) in a random 𝑛×𝑛 Latin square. In particular, for constant 𝛿>0 we prove that exp(βˆ’π‘‚(𝑛2log𝑛))β©½Pr(𝐍⩽(1βˆ’π›Ώ)𝑛2/4)β©½exp(βˆ’Ξ©(𝑛2)) and exp(βˆ’π‘‚(𝑛4/3(log𝑛)))β©½Pr(𝐍⩾(1+𝛿)𝑛2/4)β©½exp(βˆ’Ξ©(𝑛4/3(log𝑛)2/3)) . As a consequence, we deduce that a typical order- 𝑛 Latin square has (1+π‘œ(1))𝑛2/4 intercalates, matching a lower bound due to Kwan and Sudakov and resolving an old conjecture of McKay and Wanless.

Topics & Concepts

CombinatoricsMathematicsOmegaLatin squareOrder (exchange)ConjectureUpper and lower boundsPhysicsMathematical analysisChemistryQuantum mechanicsEconomicsFinanceFood scienceFermentationRumengraph theory and CDMA systemsLimits and Structures in Graph TheoryAnalytic Number Theory Research