A topological framework for signed permutations
Abstract
In this paper we present a topological framework for studying signed permutations and their reversal distance. As a result we can give an alternative approach and interpretation of the Hannenhalli-Pevzner formula for the reversal distance of signed permutations. Our approach utlizes the Poincar\'e dual, upon which reversals act in a particular way and obsoletes the notion of "padding" of the signed permutations. To this end we construct a bijection between signed permutations and an equivalence class of particular fatgraphs, called -maps, and analyze the action of reversals on the latter. We show that reversals act via either slicing, gluing or half-flipping of external vertices, which implies that any reversal changes the topological genus by at most one. Finally we revisit the Hannenhalli-Pevzner formula employing orientable and non-orientable, irreducible, -maps.
Keywords
Cite
@article{arxiv.1410.4706,
title = {A topological framework for signed permutations},
author = {Fenix W. D. Huang and Christian M. Reidys},
journal= {arXiv preprint arXiv:1410.4706},
year = {2014}
}
Comments
37 pages, 16 figures