Counting permutations by congruence class of major index

Abstract

Consider Sn, the symmetric group on n letters, and let maj pi denote the major index of a permutation pi in Sn. Given positive integers k,l and nonnegative integers i,j, define mnk,l(i,j) := number of pi in Sn such that maj pi = i (mod k) and maj pi-1 = j (mod l). We prove bijectively that if k,l are relatively prime and at most n then mnk,l(i,j) = n!/(kl) which, surprisingly, does not depend on i and j. Equivalently, if mnk,l(i,j) is interpreted as the (i,j)-entry of a matrix mnk,l, then this is a constant matrix under the stated conditions. This bijection is extended to show the more general result that for d at least 1 and k,l relatively prime, the matrix mnkd,ld admits a block decompostion where each block is the matrix mnd,d/(kl). We also give an explicit formula for mnn,n and show that if p is prime then mnpp,p has a simple block decomposition. To prove these results, we use the representation theory of the symmetric group and certain restricted shuffles.

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