On the Longest Increasing Subsequence for Finite and Countable Alphabets
Abstract
Let X1, X2, ..., Xn, ... be a sequence of iid random variables with values in a finite alphabet \1,...,m\. Let LIn be the length of the longest increasing subsequence of X1, X2, ..., Xn. We express the limiting distribution of LIn as functionals of m and (m-1)-dimensional Brownian motions. These expressions are then related to similar functionals appearing in queueing theory, allowing us to further establish asymptotic behaviors as m grows. The finite alphabet results are then used to treat the countable (infinite) alphabet.
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