@inproceedings{953389b7b0664c52a0ca000ec8c586cd,
title = "Orbital shrinking",
abstract = "Symmetry plays an important role in optimization. The usual approach to cope with symmetry in discrete optimization is to try to eliminate it by introducing artificial symmetry-breaking conditions into the problem, and/or by using an ad-hoc search strategy. In this paper we argue that symmetry is instead a beneficial feature that we should preserve and exploit as much as possible, breaking it only as a last resort. To this end, we outline a new approach, that we call orbital shrinking, where additional integer variables expressing variable sums within each symmetry orbit are introduces and used to {"}encapsulate{"} model symmetry. This leads to a discrete relaxation of the original problem, whose solution yields a bound on its optimal value. Encouraging preliminary computational experiments on the tightness and solution speed of this relaxation are presented.",
keywords = "MILP, Mathematical programming, algebra, convex MINLP, discrete optimization, relaxation, symmetry",
author = "Matteo Fischetti and Leo Liberti",
year = "2012",
month = aug,
day = "27",
doi = "10.1007/978-3-642-32147-4\_6",
language = "English",
isbn = "9783642321467",
series = "Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)",
pages = "48--58",
booktitle = "Combinatorial Optimization - Second International Symposium, ISCO 2012, Revised Selected Papers",
note = "2nd International Symposium on Combinatorial Optimization, ISCO 2012 ; Conference date: 19-04-2012 Through 21-04-2012",
}