A semidefinite programming hierarchy for covering problems in Discrete Geometry
Riener C, Rolfes J, Vallentin F (2024)
Publication Status: Submitted
Publication Type: Unpublished / Preprint
Future Publication Type: Journal article
Publication year: 2024
DOI: 10.48550/arXiv.2312.11267
Abstract
In this paper we present a new semidefinite programming hierarchy
for covering problems in compact metric spaces.
Over the last years, these kind of hierarchies were developed primarily
for geometric packing and for energy minimization problems; they frequently
provide the best known bounds.
Starting from a semidefinite programming hierarchy for the dominating set
problem in graph theory, we derive the new hierarchy for covering and show
some of its basic properties: The hierarchy converges in finitely many steps,
but the first level collapses to the volume bound when the compact metric
space is homogeneous.
Authors with CRIS profile
Involved external institutions
Universitetet i Tromsø / The Arctic University of Norway (UiT)
Norway (NO)
Universität zu Köln
Germany (DE)
Norway (NO)
Universität zu Köln
Germany (DE)
How to cite
APA:
Riener, C., Rolfes, J., & Vallentin, F. (2024). A semidefinite programming hierarchy for covering problems in Discrete Geometry. (Unpublished, Submitted).
MLA:
Riener, Cordian, Jan Rolfes, and Frank Vallentin. A semidefinite programming hierarchy for covering problems in Discrete Geometry. Unpublished, Submitted. 2024.
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