Large deviations in random latin squares
Matthew Kwan, Ashwin Sah, Mehtaab Sawhney
Abstract
In this note, we study large deviations of the number π of intercalates ( 2Γ2 combinatorial subsquares which are themselves Latin squares) in a random πΓπ Latin square. In particular, for constant πΏ>0 we prove that exp(βπ(π2logπ))β©½Pr(πβ©½(1βπΏ)π2/4)β©½exp(βΞ©(π2)) and exp(βπ(π4/3(logπ)))β©½Pr(πβ©Ύ(1+πΏ)π2/4)β©½exp(βΞ©(π4/3(logπ)2/3)) . As a consequence, we deduce that a typical order- π Latin square has (1+π(1))π2/4 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