Article ID Journal Published Year Pages File Type
431630 Journal of Discrete Algorithms 2015 9 Pages PDF
Abstract

We introduce the problem of computing the Burrows–Wheeler Transform (BWT) using small additional space. Our in-place algorithm does not need the explicit storage for the suffix sort array and the output array, as typically required in previous work. It relies on the combinatorial properties of the BWT, and runs in O(n2)O(n2) time in the comparison model using O(1)O(1) extra memory cells, apart from the array of n cells storing the n   characters of the input text. We then discuss the time–space trade-off when O(k⋅σk)O(k⋅σk) extra memory cells are allowed with σkσk distinct characters, providing an O((n2/k+n)log⁡k)O((n2/k+n)log⁡k)-time algorithm to obtain (and invert) the BWT. For example in real systems where the alphabet size is a constant, for any arbitrarily small ϵ>0ϵ>0, the BWT of a text of n   bytes can be computed in O(nϵ−1log⁡n)O(nϵ−1log⁡n) time using just ϵn extra bytes.

Related Topics
Physical Sciences and Engineering Computer Science Computational Theory and Mathematics
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