The manifold of finite rank projections in the algebra (H) of bounded linear operators

Given a complex Hilbert space H, we study the differential geometry of the manifold M of all projections in V = (H). Using the algebraic structure of V, a torsionfree affine connection (that is invariant under the group of automorphisms of V) is defined on every connected component m of M, which in this way becomes a symmetric holomorphic manifold that consists of projections of the same rank r, (0 ≤ r ≤ ∞). We prove that m admits a Riemann structure if and only if m consists of projections that have the same finite rank r or the same finite corank, and in that case is the Levi-Civita and the Kähler connection of m. Moreover, m turns out to be a totally geodesic Riemann manifold whose geodesics and Riemann distance are computed.