Brascamp-Lieb inequality and quantitative versions of Helly's theorem

Abstract

We provide a number of new quantitative versions of Helly's theorem. For example, we show that for every family \Pi:i∈ I\ of closed half-spaces Pi=\x∈ Rn: x,wi ≤ 1\ in Rn such that P=i∈ IPi has positive volume, there exist s≤ α n and i1,…, is∈ I such that |Pi1·s Pis|≤ (Cn)n\,|P|, where α, C>0 are absolute constants. These results complement and improve previous work of B\'ar\'any-Katchalski-Pach and Nasz\'odi. Our method combines the work of Srivastava on approximate John's decompositions with few vectors, a new estimate on the corresponding constant in the Brascamp-Lieb inequality and an appropriate variant of Ball's proof of the reverse isoperimetric inequality.