Topological Stability of Kinetic k-centers

Publication date

2019

Authors

van der Hoog, IvorISNI 0000000492816188
van Kreveld, MarcORCID 0000-0001-8208-3468ISNI 0000000116732175
Meulemans, Wouter
Verbeek, Kevin
Wulms, Jules

Editors

Advisors

Supervisors

Document Type

Part of book
Open Access logo

License

taverne

Abstract

We study the k-center problem in a kinetic setting: given a set of continuously moving points P in the plane, determine a set of k (moving) disks that cover P at every time step, such that the disks are as small as possible at any point in time. Whereas the optimal solution over time may exhibit discontinuous changes, many practical applications require the solution to be stable: the disks must move smoothly over time. Existing results on this problem require the disks to move with a bounded speed, but this model is very hard to work with. Hence, the results are limited and offer little theoretical insight. Instead, we study the topological stability of k-centers. Topological stability was recently introduced and simply requires the solution to change continuously, but may do so arbitrarily fast. We prove upper and lower bounds on the ratio between the radii of an optimal but unstable solution and the radii of a topologically stable solution—the topological stability ratio—considering various metrics and various optimization criteria. For k=2 we provide tight bounds, and for small k>2 we can obtain nontrivial lower and upper bounds. Finally, we provide an algorithm to compute the topological stability ratio in polynomial time for constant k.

Keywords

Stability analysis, Time-varying data, Facility location, Taverne

Citation

Hoog, I V D, van Kreveld, M J, Meulemans, W, Verbeek, K & Wulms, J 2019, Topological Stability of Kinetic k-centers. in WALCOM: Algorithms and Computation - 13th International Conference, WALCOM 2019, Guwahati, India, February 27 - March 2, 2019, Proceedings. Lecture Notes in Computer Science, vol. 11355, Springer, Cham, pp. 43-55. https://doi.org/10.1007/978-3-030-10564-8_4