Enumeration and Distribution of Permutation Rows and Columns in Equi-n-Squares
Abstract
We introduce consecutive equi-n-squares, a variant of equi-n-squares in which at least one row or column forms a fixed permutation of \1,…,n\, taken for concreteness to be (1,…,n). More generally, the enumeration and probabilistic arguments presented here extend to the occurrence of any prescribed permutation as a row or column of an equi-n-square. We derive exact and asymptotic formulas for the number of consecutive equi-n-squares, showing precisely how their proportion among all equi-n-squares rapidly approaches zero as n∞. We also analyze the distribution of consecutive equi-n-squares under uniform random sampling and explore connections to algebraic structures, interpreting equi-n-squares and consecutive equi-n-squares as Cayley tables. Finally, we supplement our theoretical results with Monte Carlo simulations for small values of n.
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