Dichotomies, structure, and concentration in normed spaces

Abstract

We use probabilistic, topological and combinatorial methods to establish the following deviation inequality: For any normed space X=( Rn ,\|·\| ) there exists an invertible linear map T: Rn Rn with \[ P( | \|TG\| - E\|TG\| | > E\|TG\| ) ≤ C ( -c\ 2, \ n ), >0, \] where G is the standard n-dimensional Gaussian vector and C,c>0 are universal constants. It follows that for every ∈ (0,1) and for every normed space X=( Rn,\|·\|) there exists a k-dimensional subspace of X which is (1+)-Euclidean and k≥ c n/1. This improves by a logarithmic on term the best previously known result due to G. Schechtman.