We study ordinal embedding relaxations in the realm of parameterized complexity. We prove the existence of a quadratic kernel for the {\sc Betweenness} problem parameterized above its tight lower bound, which is stated as follows. For a set V of variables and set C of constraints "vi \mbox{is between} vj \mbox{and} vk", decide whether there is a bijection from V to the set {1,…,∣V∣} satisfying at least ∣C∣/3+κ of the constraints in C. Our result solves an open problem attributed to Benny Chor in Niedermeier's monograph "Invitation to Fixed-Parameter Algorithms." The betweenness problem is of interest in molecular biology. An approach developed in this paper can be used to determine parameterized complexity of a number of other optimization problems on permutations parameterized above or below tight bounds.
@article{arxiv.0907.5427,
title = {Betweenness Parameterized Above Tight Lower Bound},
author = {Gregory Gutin and Eun Jung Kim and Matthias Mnich and Anders Yeo},
journal= {arXiv preprint arXiv:0907.5427},
year = {2013}
}