On Reserve and Double Covering Problems fo the Sets with Non-Euclidean Metrics

Anna Lempert; Alexander Kazakov; Quang Mung Le

On Reserve and Double Covering Problems fo the Sets with Non-Euclidean Metrics

Anna Lempert Matrosov Institute for System Dynamics and Control Theory SB RAS
Alexander Kazakov Matrosov Institute for System Dynamics and Control Theory, Siberian Branch of Russian Academy of Science, Lermontova 134, Irkutsk, Russia
Quang Mung Le

Abstract

The article is devoted to circle covering problem for a bounded set in a two-dimensional metric space with a given amount of circles. Here we focus on a more complex problem of constructing reserve and multiple coverings. Besides that, we consider the case, where covering set is a multiply-connected domain.
The numerical algorithms based on fundamental physical principles due to Fermat and Huygens is suggested and implemented. It allows us
to solve the problems for the cases of non-convex sets and non-Euclidean metrics.
Preliminary results of numerical experiments are presented and discussed. Calculations show the applicability of the proposed approach.

https://doi.org/10.2298/YJOR1711

Published

Mar 13, 2018

How to Cite

LEMPERT, Anna; KAZAKOV, Alexander; LE, Quang Mung. On Reserve and Double Covering Problems fo the Sets with Non-Euclidean Metrics. Yugoslav Journal of Operations Research, [S.l.], v. 29, n. 1, p. 69-79, mar. 2018. ISSN 2334-6043. Available at: <http://www.yujor.fon.bg.ac.rs/index.php/yujor/article/view/599>. Date accessed: 19 apr. 2024.

Citation Formats

Issue

Vol 29 No 1 (2019)

Section

Articles

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