Marcinkiewicz-type discretization of Lp-norms under the Nikolskii-type inequality assumption

Abstract

The paper studies the sampling discretization problem for integral norms on subspaces of Lp(μ). Several close to optimal results are obtained on subspaces for which certain Nikolskii-type inequality is valid. The problem of norms discretization is connected with the probabilistic question about the approximation with high probability of marginals of a high dimensional random vector by sampling. As a byproduct of our approach we refine the result of O. Guedon and M. Rudelson concerning the approximation of marginals. In particular, the obtained improvement recovers a theorem of J. Bourgain, J. Lindenstrauss, and V. Milman concerning embeddings of finite dimensional subspaces of Lp[0, 1] into pm. The proofs in the paper use the recent developments of the chaining technique by R. van Handel.