A Note on Stabbing Convex Bodies with Points, Lines, and Flats

Abstract

OConsider the problem of constructing weak -nets where the stabbing elements are lines or k-flats instead of points. We study this problem in the simplest setting where it is still interesting -- namely, the uniform measure of volume over the hypercube [0,1]d.. Specifically, a (k,)-net is a set of k-flats, such that any convex body in [0,1]d of volume larger than is stabbed by one of these k-flats. We show that for k ≥ 1, one can construct (k,)-nets of size O(1/1-k/d). We also prove that any such net must have size at least (1/1-k/d). As a concrete example, in three dimensions all -heavy bodies in [0,1]3 can be stabbed by (1/2/3) lines. Note, that these bounds are sublinear in 1/, and are thus somewhat surprising. The new construction also works for points providing a weak -net of size O(1d-1 1 ).