May 11, 2023 · A celebrated algorithm by Landau and Vishkin (JCSS '88) achieves time O(n + k^2), which is optimal as a function of n and k.
Our divide-and-conquer algorithm reduces the computation of weighted edit distance to several subproblems involving substrings of small self-edit distance and, ...
The textbook dynamic-programming algorithm computes the edit distance of two length-n strings in O(n2) time, which is optimal up to subpolynomial factors and ...
The edit distance (also known as Levenshtein distance) of two strings is the minimum number of insertions, deletions, and substitutions of characters needed ...
Aug 23, 2023 · Optimal Algorithms for Bounded Weighted Edit Distance. 1/12. Page 2. (Weighted) Edit Distance. Edit distance ed(X,Y ). Levenshtein distance.
The textbook dynamic-programming algorithm computes the edit distance of two length-n strings in O(n2) time, which is optimal up to subpolynomial factors.
Dec 26, 2023 · The textbook dynamic-programming algorithm computes the edit distance of two length-$n$ strings in $O(n^2)$ time, which is optimal up to ...
[PDF] Faster Algorithms for Bounded Tree Edit Distance - DROPS
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Abstract. Tree edit distance is a well-studied measure of dissimilarity between rooted trees with node labels. It can be computed in O(n3) time [Demaine, ...
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The edit distance of two strings is the minimum number of insertions, deletions, and substitutions needed to transform one string into the other.
In this paper, we introduce the notion of asymptotically Pareto-optimal learning algorithms. ... algorithms such as Multiplicative Weights and Follow The ...