p-Schatten commutators of projections

Abstract

Let H=H+ H- be a fixed orthogonal decomposition of the complex Hilbert space H in two infinite dimensional subspaces. We study the geometry of the set Pp of selfadjoint projections in the Banach algebra Ap=\A∈ B(H): [A,E+]∈ Bp(H)\, where E+ is the projection onto H+ and Bp(H) is the Schatten ideal of p-summable operators (1 p <∞). The norm in Ap is defined in terms of the norms of the matrix entries of the operators given by the above decomposition. The space Pp is shown to be a differentiable C∞ submanifold of Ap, and a homogeneous space of the group of unitary operators in Ap. The connected components of Pp are characterized, by means of a partition of Pp in nine classes, four discrete classes and five essential classes: - the first two corresponding to finite rank or co-rank, with the connected components parametrized by theses ranks; - the next two discrete classes carrying a Fredholm index, which parametrizes its components; - the remaining essential classes, which are connected.