Online Algorithms for Constructing Linear-size Suffix Trie
January 29, 2019 Β· Declared Dead Β· π Annual Symposium on Combinatorial Pattern Matching
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Authors
Diptarama Hendrian, Takuya Takagi, Shunsuke Inenaga
arXiv ID
1901.10045
Category
cs.DS: Data Structures & Algorithms
Citations
4
Venue
Annual Symposium on Combinatorial Pattern Matching
Last Checked
4 months ago
Abstract
The suffix trees are fundamental data structures for various kinds of string processing. The suffix tree of a string $T$ of length $n$ has $O(n)$ nodes and edges, and the string label of each edge is encoded by a pair of positions in $T$. Thus, even after the tree is built, the input text $T$ needs to be kept stored and random access to $T$ is still needed. The linear-size suffix tries (LSTs), proposed by Crochemore et al. [Linear-size suffix tries, TCS 638:171-178, 2016], are a `stand-alone' alternative to the suffix trees. Namely, the LST of a string $T$ of length $n$ occupies $O(n)$ total space, and supports pattern matching and other tasks in the same efficiency as the suffix tree without the need to store the input text $T$. Crochemore et al. proposed an offline algorithm which transforms the suffix tree of $T$ into the LST of $T$ in $O(n \log Ο)$ time and $O(n)$ space, where $Ο$ is the alphabet size. In this paper, we present two types of online algorithms which `directly' construct the LST, from right to left, and from left to right, without constructing the suffix tree as an intermediate structure. Both algorithms construct the LST incrementally when a new symbol is read, and do not access to the previously read symbols. The right-to-left construction algorithm works in $O(n \log Ο)$ time and $O(n)$ space and the left-to-right construction algorithm works in $O(n (\log Ο+ \log n / \log \log n))$ time and $O(n)$ space. The main feature of our algorithms is that the input text does not need to be stored.
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