Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
10118289 | Advances in Applied Mathematics | 2018 | 39 Pages |
Abstract
Motivated by applications to string processing, we introduce variants of the Lyndon factorization called inverse Lyndon factorizations. Their factors, named inverse Lyndon words, are in a class that strictly contains anti-Lyndon words, that is Lyndon words with respect to the inverse lexicographic order. The Lyndon factorization of a nonempty word w is unique but w may have several inverse Lyndon factorizations. We prove that any nonempty word w admits a canonical inverse Lyndon factorization, named ICFL(w), that maintains the main properties of the Lyndon factorization of w: it can be computed in linear time, it is uniquely determined, and it preserves a compatibility property for sorting suffixes. In particular, the compatibility property of ICFL(w) is a consequence of another result: any factor in ICFL(w) is a concatenation of consecutive factors of the Lyndon factorization of w with respect to the inverse lexicographic order.
Related Topics
Physical Sciences and Engineering
Mathematics
Applied Mathematics
Authors
Paola Bonizzoni, Clelia De Felice, Rocco Zaccagnino, Rosalba Zizza,