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NONPOSITIVELY CURVED METRIC IN THE POSITIVE CONE OF A FINITE VON NEUMANN ALGEBRA

Published online by Cambridge University Press:  18 August 2006

E. ANDRUCHOW
Affiliation:
Instituto de Ciencias, Universidad Nacional de General Sarmiento, J. M. Gutierrez 1150, (1613) Los Polvorines, Buenos Aires, [email protected]
G. LAROTONDA
Affiliation:
Instituto de Ciencias, Universidad Nacional de General Sarmiento, J. M. Gutierrez 1150, (1613) Los Polvorines, Buenos Aires, [email protected]
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Abstract

In this paper we study the metric geometry of the space $\Sigma$ of positive invertible elements of a von Neumann algebra ${\mathcal A}$ with a finite, normal and faithful tracial state $\tau$. The trace induces an incomplete Riemannian metric $\langle x,y\rangle_a=\tau (ya^{-1}xa^{-1})$, and, though the techniques involved are quite different, the situation here resembles in many relevant aspects that of the $n\times n$ matrices when they are regarded as a symmetric space. For instance, we prove that geodesics are the shortest paths for the metric induced, and that the geodesic distance is a convex function; we give an intrinsic (algebraic) characterization of the geodesically convex submanifolds $M$ of $\Sigma$; and under a suitable hypothesis we prove a factorization theorem for elements in the algebra that resembles the Iwasawa decomposition for matrices. This factorization is obtained via a nonlinear orthogonal projection $\Pi_M:\Sigma\to M$, a map which turns out to be contractive for the geodesic distance.

Type
Notes and Papers
Copyright
The London Mathematical Society 2006

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