A note on the Hanson-Wright inequality for random vectors with dependencies
Abstract
We prove that quadratic forms in isotropic random vectors in , possessing the convex concentration property with constant , satisfy the Hanson-Wright inequality with constant , where is an absolute constant, thus eliminating the logarithmic (in the dimension) factors in a recent estimate by Vu and Wang. We also show that the concentration inequality for all Lipschitz functions implies a uniform version of the Hanson-Wright inequality for suprema of quadratic forms (in the spirit of the inequalities by Borell, Arcones-Gin\'e and Ledoux-Talagrand). Previous results of this type relied on stronger isoperimetric properties of and in some cases provided an upper bound on the deviations rather than a concentration inequality. In the last part of the paper we show that the uniform version of the Hanson-Wright inequality for Gaussian vectors can be used to recover a recent concentration inequality for empirical estimators of the covariance operator of -valued Gaussian variables due to Koltchinskii and Lounici.
Cite
@article{arxiv.1409.8457,
title = {A note on the Hanson-Wright inequality for random vectors with dependencies},
author = {Radosław Adamczak},
journal= {arXiv preprint arXiv:1409.8457},
year = {2014}
}