The distribution on permutations induced by a random parking function
Abstract
A parking function on [n] creates a permutation in Sn via the order in which the n cars appear in the n parking spaces. Placing the uniform probability measure on the set of parking functions on [n] induces a probability measure on Sn. We initiate a study of some properties of this distribution. Let Pnpark denote this distribution on Sn and let Pn denote the uniform distribution on Sn. In particular, we obtain an explicit formula for Pnpark(σ) for all σ∈ Sn. Then we show that for all but an asymptotically Pn-negligible set of permutations, one has Pnpark(σ)∈((2-ε)n(n+1)n-1,(2+ε)n(n+1)n-1). However, this accounts for only an exponentially small part of the Pnpark-probability. We also obtain an explicit formula for Pnpark(σ-1n-j+1=i1,σ-1n-j+2=i2,·s, σ-1n=ij), the probability that the last j cars park in positions i1,·s, ij respectively, and show that the j-dimensional random vector (n+1-σ-1n-j+l, n+1-σ-1n-j+2,·s, n+1-σ-1n) under Pnpark converges in distribution to a random vector (Σr=1jXr,Σr=2j Xr,·s, Xj-1+Xj,Xj), where \Xr\r=1j are IID with the Borel distribution. We then show that in fact for jn=o(n16), the final jn cars will park in increasing order with probability approaching 1 as n∞. We also obtain an explicit formula for the expected value of the left-to-right maximum statistic XnLR-max, which counts the total number of left-to-right maxima in a permutation, and show that EnparkXnLR-max grows approximately on the order n12.
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