Metric Xp inequalities

Abstract

For every p∈ (0,∞) we associate to every metric space (X,dX) a numerical invariant Xp(X)∈ [0,∞] such that if Xp(X)<∞ and a metric space (Y,dY) admits a bi-Lipschitz embedding into X then also Xp(Y)<∞. We prove that if p,q∈ (2,∞) satisfy q<p then Xp(Lp)<∞ yet Xp(Lq)=∞. Thus our new bi-Lipschitz invariant certifies that Lq does not admit a bi-Lipschitz embedding into Lp when 2<q<p<∞. This completes the long-standing search for bi-Lipschitz invariants that serve as an obstruction to the embeddability of Lp spaces into each other, the previously understood cases of which were metric notions of type and cotype, which however fail to certify the nonembeddability of Lq into Lp when 2<q<p<∞. Among the consequences of our results are new quantitative restrictions on the bi-Lipschitz embeddability into Lp of snowflakes of Lq and integer grids in qn, for 2<q<p<∞. As a byproduct of our investigations, we also obtain results on the geometry of the Schatten p trace class Sp that are new even in the linear setting.