The Gaussian measure of a convex body controls its maximal covering radius
Abstract
The well-studied vector balancing constant β(U, V) of a pair of convex bodies (U,V), is lower bounded by a lattice counterpart, α(U,V). In [BS97], Banaszczyk and Szarek proved that α(B2n, V)≤ c when V has Gaussian measure at least 12, and conjectured that, for centrally symmetric V, β(B2n, V) is always bounded by a function of the Gaussian measure of V, independent of n. We resolve this conjecture in the affirmative. Moreover, we show that the analogous result holds for α(B2n, V) even without the central symmetry assumption.
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