Linear-time string indexing and analysis in small space

dc.contributor.authorBelazzougui, Djamal
dc.contributor.authorCunial, Fabio
dc.contributor.authorKärkkäinen, Juha
dc.contributor.authorMäkinen, Veli
dc.date.accessioned2023-10-11T13:24:37Z
dc.date.available2023-10-11T13:24:37Z
dc.date.issued2020-03-09
dc.description.abstractThe field of succinct data structures has flourished over the last 16 years. Starting from the compressed suffix array by Grossi and Vitter (STOC 2000) and the FM-index by Ferragina and Manzini (FOCS 2000), a number of generalizations and applications of string indexes based on the Burrows-Wheeler transform (BWT) have been developed, all taking an amount of space that is close to the input size in bits. In many large-scale applications, the construction of the index and its usage need to be considered as one unit of computation. For example, one can compare two genomes by building a common index for their concatenation, and by detecting common substructures by querying the index. Efficient string indexing and analysis in small space lies also at the core of a number of primitives in the data-intensive field of high-throughput DNA sequencing. We report the following advances in string indexing and analysis. We show that the BWT of a string T ∈ {1, . . . ,σ }^n can be built in deterministic O (n) time using just O (n log σ ) bits of space, where σ ≤ n. Deterministic linear time is achieved by exploiting a new partial rank data structure that supports queries in constant time, and that might have independent interest. Within the same time and space budget, we can build an index based on the BWT that allows one to enumerate all the internal nodes of the suffix tree of T . Many fundamental string analysis problems, such as maximal repeats, maximal unique matches, and string kernels, can be mapped to such enumeration, and can thus be solved in deterministic O (n) time and in O (n log σ ) bits of space from the input string, by tailoring the enumeration algorithm to some problem-specific computations. We also show how to build many of the existing indexes based on the BWT, such as the compressed suffix array, the compressed suffix tree, and the bidirectional BWT index, in randomized O (n) time and in O (n log σ ) bits of space. The previously fastest construction algorithms for BWT, compressed suffix array and compressed suffix tree, which used O (n log σ ) bits of space, took O (n log log σ ) time for the first two structures, and O (n log^ϵ n) time for the third, where ϵ is any positive constant smaller than one. Alternatively, the BWT could be previously built in linear time if one was willing to spend O (n log σ log log_σ n) bits of space. Contrary to the state of the art, our bidirectional BWT index supports every operation in constant time per element in its output.
dc.identifier.doi10.1145/3381417
dc.identifier.urihttps://dl.cerist.dz/handle/CERIST/991
dc.publisherAssociation for Computing Machinery
dc.relation.ispartofseriesACM Transactions on Algorithms (TALG), 16(2)
dc.relation.pages1-54
dc.structureCalcul pervasif et mobile (Pervasive and Mobile Computing group)
dc.subjectCompact and Succinct Data Structures
dc.subjectString Indexing and Analysis
dc.subjectLinear-Time String Processing
dc.subjectCompressed Suffix Trees and Suffix Arrays
dc.subjectBurrows-Wheeler Transform and FM-Index
dc.subjectSuffix-link Tree
dc.subjectBidirectional BWT Index
dc.subjectMonotone Minimal Rerfect Hash Functions
dc.subjectMatching Statistics
dc.subjectMaximal Unique and Exact Matches
dc.subjectString Kernels
dc.subjectMinimal Absent Words
dc.subjectMaximal Repeats
dc.titleLinear-time string indexing and analysis in small space
dc.typeArticle
Files
Original bundle
Now showing 1 - 1 of 1
Loading...
Thumbnail Image
Name:
talg.pdf
Size:
1.43 MB
Format:
Adobe Portable Document Format
Description:
License bundle
Now showing 1 - 1 of 1
Loading...
Thumbnail Image
Name:
license.txt
Size:
1.71 KB
Format:
Item-specific license agreed upon to submission
Description: