Complex interpolation and twisted twisted Hilbert spaces

Abstract

We show that Rochberg's generalizared interpolation spaces Z(n) arising from analytic families of Banach spaces form exact sequences 0 Z(n) Z(n+k) Z(k) 0. We study some structural properties of those sequences; in particular, we show that nontriviality, having strictly singular quotient map, or having strictly cosingular embedding depend only on the basic case n=k=1. If we focus on the case of Hilbert spaces obtained from the interpolation scale of p spaces, then Z(2) becomes the well-known Kalton-Peck Z2 space; we then show that Z(n) is (or embeds in, or is a quotient of) a twisted Hilbert space only if n=1,2, which solves a problem posed by David Yost; and that it does not contain 2 complemented unless n=1. We construct another nontrivial twisted sum of Z2 with itself that contains 2 complemented.