A spectral gap precludes low-dimensional embeddings

Abstract

We prove that there is a universal constant C>0 with the following property. Suppose that n∈ N and that A=(aij)∈ Mn(R) is a symmetric stochastic matrix. Denote the second-largest eigenvalue of A by λ2(A). Then for any finite-dimensional normed space (X,\|·\|) we have ∀\, x1,…,xn∈ X, dim(X) 12 (C1-λ2(A)n(Σi=1nΣj=1n\|xi-xj\|2Σi=1nΣj=1naij\|xi-xj\|2)12). This implies that if an n-vertex O(1)-expander embeds with average distortion D 1 into X, then necessarily dim(X) nc/D for some universal constant c>0, thus improving over the previously best-known estimate dim(X) ( n)2/D2 of Linial, London and Rabinovich, strengthening a theorem of Matousek, and answering a question of Andoni, Nikolov, Razenshteyn and Waingarten.