Group actions on twisted sums of Banach spaces

Abstract

We study bounded actions of groups and semigroups G on exact sequences of Banach spaces from the point of view of quasilinear maps, characterize the actions on the twisted sum space by commutator estimates and introduce the associated notions of G-centralizer and G-equivariant map. We will show that when (A) G is an amenable group and (U) the target space is complemented in its bidual by a G-equivariant projection, then uniformly bounded compatible families of operators generate bounded actions on the twisted sum space; that compatible quasilinear maps are linear perturbations of G-centralizers; and that, under (A) and (U), G-centralizers are bounded perturbations of G-equivariant maps. The previous results are optimal. Several examples and counterexamples are presented involving the action of the isometry group of Lp(0,1), p≠ 2 on the Kalton-Peck space Zp, certain non-unitarizable triangular representations of the free group F∞ on the Hilbert space, the compatibility of complex structures on twisted sums, or bounded actions on the interpolation scale of Lp-spaces. In the last section we consider the category of G-Banach spaces and study its exact sequences, showing that, under (A) and (U), G-splitting and usual splitting coincide.