Sorting Signed Permutations by Reversals in Nearly-Linear Time
Abstract
Given a signed permutation on elements, we need to sort it with the fewest reversals. This is a fundamental algorithmic problem motivated by applications in comparative genomics, as it allows to accurately model rearrangements in small genomes. The first polynomial-time algorithm was given in the foundational work of Hannenhalli and Pevzner [J. ACM'99]. Their approach was later streamlined and simplified by Kaplan, Shamir, and Tarjan [SIAM J. Comput.'99] and their framework has eventually led to an algorithm that works in time given by Tannier, Bergeron, and Sagot [Discr. Appl. Math.'07]. However, the challenge of finding a nearly-linear time algorithm remained unresolved. In this paper, we show how to leverage the results on dynamic graph connectivity to obtain a surprisingly simple time algorithm for this problem.
Cite
@article{arxiv.2308.15928,
title = {Sorting Signed Permutations by Reversals in Nearly-Linear Time},
author = {Bartłomiej Dudek and Paweł Gawrychowski and Tatiana Starikovskaya},
journal= {arXiv preprint arXiv:2308.15928},
year = {2023}
}