Extreme points, positive Grothendieck constants and tensor product norms

Abstract

We study several interrelated problems arising from the interplay between extreme point theory, Grothendieck-type inequalities, and tensor product norms. We develop a general framework for characterizing the extreme points of the set of positive contractions AX Y between finite-dimensional Banach spaces, with explicit results for X=1n, Y=∞n and vice versa. These characterizations are applied to evaluate several constants exactly. We show that the positive Grothendieck constant KG+,R(3) equals 9/8 and that the smallest constant ρ+(X) for which \|A\|π≤slant ρ+(X)\|A\|ε holds for all A ≥slant 0 equals 5/4 when X=3∞(R). We also prove that ρ+(X)=1 when X=∞n(C) and n≤slant 3. Finally, we prove that ρ+(X) = 1 for every 2-dimensional subspace X of 3∞(C); since this is stronger than the 2-summing property, it recovers Proposition~4.4 of AFJS95.

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