Optimal terminal dimensionality reduction in Euclidean space

Abstract

Let ∈(0,1) and X⊂ Rd be arbitrary with |X| having size n>1. The Johnson-Lindenstrauss lemma states there exists f:X→ Rm with m = O(-2 n) such that ∀ x∈ X\ ∀ y∈ X, \|x-y\|2 \|f(x)-f(y)\|2 (1+)\|x-y\|2 . We show that a strictly stronger version of this statement holds, answering one of the main open questions of [MMMR18]: "∀ y∈ X" in the above statement may be replaced with "∀ y∈ Rd", so that f not only preserves distances within X, but also distances to X from the rest of space. Previously this stronger version was only known with the worse bound m = O(-4 n). Our proof is via a tighter analysis of (a specific instantiation of) the embedding recipe of [MMMR18].