Publication detail
Minimum-Volume Covering Ellipsoids: Improving the Efficiency of the Wolfe-Atwood Algorithm for Large-Scale Instances by Pooling and Batching
KŮDELA, J.
Original Title
Minimum-Volume Covering Ellipsoids: Improving the Efficiency of the Wolfe-Atwood Algorithm for Large-Scale Instances by Pooling and Batching
Type
journal article in Scopus
Language
English
Original Abstract
The Minimum-Volume Covering Ellipsoid (MVCE) problem is an important opti-mization problem that comes up in various areas of engineering and statistics. Inthis paper, we improve the state-of-the-art Wolfe-Atwood algorithm for solving theMVCE problem with pooling and batching procedures. This implementation yieldssignificant improvements on the runtime of the algorithm for large-scale instancesof the MVCE problem, which is demonstrated on quite extensive computationalexperiments.
Keywords
minimum-volume covering ellipsoid; Lowner-John ellipsoid; large-scale optimization; Wolfe-Atwood algorithm; pooling; batching
Authors
KŮDELA, J.
Released
21. 12. 2019
Publisher
Brno University of Technology
Location
Brno, Czech Republic
ISBN
1803-3814
Periodical
Mendel Journal series
Year of study
25
Number
2
State
Czech Republic
Pages from
19
Pages to
26
Pages count
8
URL
BibTex
@article{BUT163938,
author="Jakub {Kůdela}",
title="Minimum-Volume Covering Ellipsoids: Improving the Efficiency of the Wolfe-Atwood Algorithm for Large-Scale Instances by Pooling and Batching",
journal="Mendel Journal series",
year="2019",
volume="25",
number="2",
pages="19--26",
doi="10.13164/mendel.2019.2.019",
issn="1803-3814",
url="https://mendel-journal.org/index.php/mendel/article/view/104"
}