Continuously Increasing Subsequences of Random Multiset Permutations

Abstract

For a word π and integer i, we define Li(π) to be the length of the longest subsequence of the form i(i+1)·s j, and we let L(π):=i Li(π). In this paper we estimate the expected values of L1(π) and L(π) when π is chosen uniformly at random from all words which use each of the first n integers exactly m times. We show that E[L1(π)] m if n is sufficiently larger in terms of m as m tends towards infinity, confirming a conjecture of Diaconis, Graham, He, and Spiro. We also show that E[L(π)] is asymptotic to the inverse gamma function -1(n) if n is sufficiently large in terms of m as m tends towards infinity.

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