Grothendieck's inequalities for JB*-triples: Proof of the Barton-Friedman conjecture

Abstract

We prove that, given a constant K> 2 and a bounded linear operator T from a JB*-triple E into a complex Hilbert space H, there exists a norm-one functional ∈ E* satisfying \|T(x)\| ≤ K \, \|T\| \, \|x\|, for all x∈ E. Applying this result we show that, given G > 8 (1+23) and a bounded bilinear form V on the Cartesian product of two JB*-triples E and B, there exist norm-one functionals ∈ E* and ∈ B* satisfying |V(x,y)| ≤ G \ \|V\| \, \|x\| \, \|y\| for all (x,y)∈ E × B. These results prove a conjecture pursued during almost twenty years.