The two-sided peak polynomial
Abstract
We derive a generating function identity for the joint distribution of the numbers of peaks of a permutation and its inverse, via enriched P-partitions. The coefficients of the corresponding peak polynomial Wn(s,t) satisfy a second-order recurrence. A martingale formulation of this recurrence yields a bivariate central limit theorem, showing that the two statistics are asymptotically independent. We also give an exact closed form for their covariance, which is of order n-1.
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