Generalized suffix tree

In computer science, a generalized suffix tree is a suffix tree for a set of strings. Given the set of strings ${\displaystyle D=S_{1},S_{2},\dots ,S_{d}}$ of total length ${\displaystyle n}$, it is a Patricia tree containing all ${\displaystyle n}$ suffixes of the strings. It is mostly used in bioinformatics.^[1]

Suffix tree for the strings ABAB and BABA. Suffix links not shown.

Functionality

It can be built in ${\displaystyle \Theta (n)}$  time and space, and can be used to find all ${\displaystyle z}$  occurrences of a string ${\displaystyle P}$  of length ${\displaystyle m}$  in ${\displaystyle O(m+z)}$  time, which is asymptotically optimal (assuming the size of the alphabet is constant^[2]: 119).

When constructing such a tree, each string should be padded with a unique out-of-alphabet marker symbol (or string) to ensure no suffix is a substring of another, guaranteeing each suffix is represented by a unique leaf node.

Algorithms for constructing a GST include Ukkonen's algorithm (1995) and McCreight's algorithm (1976).

Example

A suffix tree for the strings ABAB and BABA is shown in a figure above. They are padded with the unique terminator strings $0 and $1. The numbers in the leaf nodes are string number and starting position. Notice how a left to right traversal of the leaf nodes corresponds to the sorted order of the suffixes. The terminators might be strings or unique single symbols. Edges on $ from the root are left out in this example.

Alternatives

An alternative to building a generalized suffix tree is to concatenate the strings, and build a regular suffix tree or suffix array for the resulting string. When hits are evaluated after a search, global positions are mapped into documents and local positions with some algorithm and/or data structure, such as a binary search in the starting/ending positions of the documents.

References

1. Paul Bieganski; John Riedl; John Carlis; Ernest F. Retzel (1994). "Generalized Suffix Trees for Biological Sequence Data". Biotechnology Computing, Proceedings of the Twenty-Seventh Hawaii International Conference on. pp. 35–44. doi:10.1109/HICSS.1994.323593.
2. Gusfield, Dan (1999) [1997]. Algorithms on Strings, Trees and Sequences: Computer Science and Computational Biology. USA: Cambridge University Press. ISBN 978-0-521-58519-4.

External links

•   Media related to Generalized suffix tree at Wikimedia Commons
• A C implementation of Generalized Suffix Tree for two strings