Approximate Carath\'eodory's theorem in uniformly smooth Banach spaces

Abstract

We study the 'no-dimension' analogue of Carath\'eodory's theorem in Banach spaces. We prove such a result together with its colorful version for uniformly smooth Banach spaces. It follows that uniform smoothness leads to a greedy de-randomization of Maurey's classical lemma pisier1980remarques, which is itself a 'no-dimension' analogue of Carath\'eodory's theorem with a probabilistic proof. We find the asymptotically tight upper bound on the deviation of the convex hull from the k-convex hull of a bounded set in Lp with 1 < p ≤ 2 and get asymptotically the same bound as in Maurey's lemma for Lp with 1 < p < ∞.