Projective geometry in the Poincar\'e disk of a C*-algebra

Abstract

We study the Poincar\'e disk D=\a∈ A: \|a\|<1\ of a C*-algebra A from a projective point of view: D is regarded as an open subset of the projective line P1 A, the space of complemented rank one submodules of A2. We introduce the concept of cross ratio of four points in P1 A. Our main result establishes the relation between the exponential map Expz0(z1) of D (z0,z1∈ D) and the cross ratio of the four-tuple δ(-∞), δ(0)=z0, δ(1)=z1 , δ(+∞), where δ is the unique geodesic of D joining z0 and z1 at times t=0 and t=1, respectively.