The Johnson-Lindenstrauss lemma almost characterizes Hilbert space, but not quite

Abstract

Let X be a normed space that satisfies the Johnson-Lindenstrauss lemma (J-L lemma, in short) in the sense that for any integer n and any x1,…,xn∈ X there exists a linear mapping L:X F, where F⊂eq X is a linear subspace of dimension O( n), such that \|xi-xj\|\|L(xi)-L(xj)\| O(1)·\|xi-xj\| for all i,j∈ \1,…, n\. We show that this implies that X is almost Euclidean in the following sense: Every n-dimensional subspace of X embeds into Hilbert space with distortion 22O(*n). On the other hand, we show that there exists a normed space Y which satisfies the J-L lemma, but for every n there exists an n-dimensional subspace En⊂eq Y whose Euclidean distortion is at least 2(α(n)), where α is the inverse Ackermann function.