Geodesics of projections in von Neumann algebras

Abstract

Let A be a von Neumann algebra and P A the manifold of projections in A. There is a natural linear connection in P A, which in the finite dimensional case coincides with the the Levi-Civita connection of the Grassmann manifold of Cn. In this paper we show that two projections p,q can be joined by a geodesic, which has minimal length (with respect to the metric given by the usual norm of A), if and only if p q p q, where stands for the Murray-von Neumann equivalence of projections. It is shown that the minimal geodesic is unique if and only if p q= p q=0. If A is a finite factor, any pair of projections in the same connected component of P A (i.e., with the same trace) can be joined by a minimal geodesic. We explore certain relations with Jones' index theory for subfactors. For instance, it is shown that if N⊂ M are II1 factors with finite index [ M: N]=t-1, then the geodesic distance d(e N,e M) between the induced projections e N and e M is d(e N,e M)=(t1/2).