English

Quantitative affine approximation for UMD targets

Functional Analysis 2017-01-18 v5 Metric Geometry

Abstract

It is shown here that if (Y,Y)(Y,\|\cdot\|_Y) is a Banach space in which martingale differences are unconditional (a UMD Banach space) then there exists c=c(Y)(0,)c=c(Y)\in (0,\infty) with the following property. For every nNn\in \mathbb{N} and ε(0,1/2]\varepsilon\in (0,1/2], if (X,X)(X,\|\cdot\|_X) is an nn-dimensional normed space with unit ball BXB_X and f:BXYf:B_X\to Y is a 11-Lipschitz function then there exists an affine mapping Λ:XY\Lambda:X\to Y and a sub-ball B=y+ρBXBXB^*=y+\rho B_X\subseteq B_X of radius ρexp((1/ε)cn)\rho\ge \exp(-(1/\varepsilon)^{cn}) such that f(x)Λ(x)Yερ\|f(x)-\Lambda(x)\|_Y\le \varepsilon \rho for all xBx\in B^*. This estimate on the macroscopic scale of affine approximability of vector-valued Lipschitz functions is an asymptotic improvement (as nn\to \infty) over the best previously known bound even when XX is Rn\mathbb{R}^n equipped with the Euclidean norm and YY is a Hilbert space.

Keywords

Cite

@article{arxiv.1510.00276,
  title  = {Quantitative affine approximation for UMD targets},
  author = {Tuomas Hytönen and Sean Li and Assaf Naor},
  journal= {arXiv preprint arXiv:1510.00276},
  year   = {2017}
}

Comments

This new version of the article has been reformatted using the Discrete Analysis style, but is otherwise identical to the previous version

R2 v1 2026-06-22T11:10:21.478Z