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In this paper, we generalise several recent results by Archer and Geary on descents in powers of permutations, and confirm all their conjectures. Specifically, for all k^+, we prove explicit formulas for the expected numbers of descents and inversions in the k-th powers of permutations in Sₙ for all n2k+1. We also compute the number of Grassmanian permutations in Sₙ whose k-th powers remain Grassmanian, and the number of permutations in Sₙ whose k-th powers have the maximum number of descents.
Cambie et al. (Fri,) studied this question.