The Riemann sphere of a C*-algebra

Abstract

Given the unital C*-algebra A, the unitary orbit of the projector p0=pmatrix1 & 0 \\ 0 & 0 pmatrix in the C*-algebra M2(A) of 2× 2 matrices with coefficients in A is called in this paper, the Riemann sphere R of A. We show that R is a homogeneous reductive C∞ manifold of the unitary group U2(A)⊂ M2(A) and carries the differential geometry deduced from this structure (including an invariant Finsler metric). Special attention is paid to the properties of geodesics and the exponential map. If the algebra A is represented in a Hilbert space H, in terms of local charts of R, elements of the Riemann sphere may be identified with (graphs of) closed operators on H (bounded or unbounded). In the first part of the paper, we develop several geometric aspects of R including a relation between the exponential map of the reductive connection and the cross-ratio of subspaces of H× H. In the last section we show some applications of the geometry of R, to the geometry of operators on a Hilbert space. In particular, we define the notion of bounded deformation of an unbounded operator and give some relevant examples.