English

Approximating $L_p$ unit balls via random sampling

Probability 2020-08-20 v1 Functional Analysis

Abstract

Let XX be an isotropic random vector in RdR^d that satisfies that for every vSd1v \in S^{d-1}, <X,v>LqL<X,v>Lp\|<X,v>\|_{L_q} \leq L \|<X,v>\|_{L_p} for some q2pq \geq 2p. We show that for 0<ε<10<\varepsilon<1, a set of N=c(p,q,ε)dN = c(p,q,\varepsilon) d random points, selected independently according to XX, can be used to construct a 1±ε1 \pm \varepsilon approximation of the LpL_p unit ball endowed on RdR^d by XX. Moreover, c(p,q,ε)cpε2log(2/ε)c(p,q,\varepsilon) \leq c^p \varepsilon^{-2}\log(2/\varepsilon); when q=2pq=2p the approximation is achieved with probability at least 12exp(cNε2/log2(2/ε))1-2\exp(-cN \varepsilon^2/\log^2(2/\varepsilon)) and if qq is much larger than pp---say, q=4pq=4p, the approximation is achieved with probability at least 12exp(cNε2)1-2\exp(-cN \varepsilon^2). In particular, when XX is a log-concave random vector, this estimate improves the previous state-of-the-art---that N=c(p,ε)dp/2logdN=c^\prime(p,\varepsilon) d^{p/2}\log d random points are enough, and that the approximation is valid with constant probability.

Keywords

Cite

@article{arxiv.2008.08380,
  title  = {Approximating $L_p$ unit balls via random sampling},
  author = {Shahar Mendelson},
  journal= {arXiv preprint arXiv:2008.08380},
  year   = {2020}
}
R2 v1 2026-06-23T17:57:37.512Z