The Dynamic Longest Increasing Subsequence Problem
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In this paper, we construct a data structure to efficiently compute the longest increasing subsequence of a sequence subject to dynamic updates. Our data structure supports a query for the longest increasing subsequence in $O(r+\log n)$ worst-case time and supports inserts anywhere in the sequence in $O \left(r\log{n/r}\right)$ worst-case time (where $r$ is the length of the longest increasing subsequence). The same data structure with a minor modification supports $O(\log n)$ worst-case time insertions if the insertions are performed at the end of the sequence. The data structure presented can also be augmented to support delete operations in the same worst-case time as insertions.
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Exact Sampling of Permutations with a Fixed Longest Increasing Subsequence
Exact samplers for permutations with fixed LIS length k: O(n log log n) expected time rejection sampler when k=Theta(n), and tilde O(n^3 k^4) RS-based sampler for arbitrary k via determinant oracles on Hankel moment matrices.
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