On counting permutations by pairs of congruence classes of major index
Abstract
For a fixed positive integer n, let Sn denote the symmetric group of n! permutations on n symbols, and let maj(sigma) denote the major index of a permutation sigma. For positive integers k<m not greater than n and non-negative integers i and j, we give enumerative formulas for the cardinality of the set of permutations sigma in Sn with maj(sigma) congruent to i mod k and maj(sigma(-1)) congruent to j mod m. When m divides n-1 and k divides n, we show that for all i,j, this cardinality equals (n!)/(km).
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