An average John theorem

Abstract

We prove that the 12-snowflake of a finite-dimensional normed space (X,\|·\|X) embeds into a Hilbert space with quadratic average distortion O( dim(X)). We deduce from this (optimal) statement that if an n-vertex expander embeds with average distortion D≥slant 1 into (X,\|·\|X), then necessarily dim(X)≥slant n(1/D), which is sharp by the work of Johnson, Lindenstrauss and Schechtman (1987). This improves over the previously best-known bound dim(X) ( n)2/D2 of Linial, London and Rabinovich (1995), strengthens a theorem of Matousek (1996) which resolved questions of Johnson and Lindenstrauss (1982), Bourgain (1985) and Arias-de-Reyna and Rodr\'guez-Piazza (1992), and answers negatively a question that was posed (for algorithmic purposes) by Andoni, Nguyen, Nikolov, Razenshteyn and Waingarten (2016).