On the Hadwiger covering problem in low dimensions
Abstract
Let Hn be the minimal number of smaller homothetic copies of an n-dimensional convex body required to cover the whole body. Equivalently, Hn can be defined via illumination of the boundary of a convex body by external light sources. The best known upper bound in three-dimensional case is H3 16 and is due to Papadoperakis. We use Papadoperakis' approach to show that H4 96, H5 1091 and H6 15373 which significantly improve the previously known upper bounds on Hn in these dimensions.
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