Artículo
Homogeneous manifolds from noncommutative measure spaces
Fecha de publicación:
05/2010
Editorial:
Academic Press Inc Elsevier Science
Revista:
Journal of Mathematical Analysis and Applications
ISSN:
0022-247X
Idioma:
Inglés
Tipo de recurso:
Artículo publicado
Clasificación temática:
Resumen
Let M be a finite von Neumann algebra with a faithful trace τ. In this paper we study metric geometry of homogeneous spaces O of the unitary group U of M, endowed with a Finsler quotient metric induced by the p-norms of τ, ||x||_p=τ(|x|^p)^{1/p}, p ≥ 1. The main results include the following. The unitary group carries on a rectifiable distance d_p induced by measuring the length of curves with the p-norm. If we identify O as a quotient of groups, then there is a natural quotient distance d_p that metrizes the quotient topology. On the other hand, the Finsler quotient metric defined in O provides a way to measure curves, and therefore, there is an associated rectifiable distance d_{O,p}$,. For p ≥2, we prove that the distances d_p and d_{O , p} coincide. Based on this fact, we show that the metric space (O,d_p) is a complete path metric space. The other problem treated in this article is the existence of metric geodesics, or curves of minimal length, in O. We give two abstract partial results in this direction. The first concerns the initial values problem and the second the fixed endpoints problem. We show how these results apply to several examples. In the process, we improve some results about the metric geometry of UM with the p-norm.
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Articulos(IAM)
Articulos de INST.ARG.DE MATEMATICAS "ALBERTO CALDERON"
Articulos de INST.ARG.DE MATEMATICAS "ALBERTO CALDERON"
Citación
Andruchow, Esteban; Chiumiento, Eduardo Hernan; Larotonda, Gabriel Andrés; Homogeneous manifolds from noncommutative measure spaces; Academic Press Inc Elsevier Science; Journal of Mathematical Analysis and Applications; 365; 2; 5-2010; 541-558
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