On complex structures and uniqueness of algebra norms in Banach spaces

Abstract

For X an infinite dimensional Banach space, we contribute to the study of the Banach algebra L(X)/S(X), where S(X) is the ideal of strictly singular operators. We extend results of Ferenczi-Galego (2007) by proving that \|I-J\|S ≥ 2, whenever I is a complex structure on a real space X and J extends a complex structure on a hyperplane of X, and where \|.\|S denotes a certain algebra norm on L(X)/S(X) dominated by the usual quotient norm \|.\|. We solve two questions of Kalton-Swanson (1982) by proving that if X=Z2 the Kalton-Peck space, then L(Z2)/S(Z2) a) is not complete for \|.\|S and b) that it is not *-isomorphic to a C*-algebra for \|.\|. In particular L(Z2)/S(Z2) admits two inequivalent *-algebra norms.