On the geometry of generalized inverses

Andruchow, Esteban; Corach, Gustavo; Мbekhta, Mostafa

doi:10.1002/mana.200310270

Cited by 19 publications

(21 citation statements)

References 27 publications

Supporting

Mentioning

Contrasting

Unclassified

Order By: Relevance

“…There are several papers concerning the geometry and topology of partial isometries endowed with the spectral norm (see, for instance, [2], [3], [9] and [12]) . On the other hand, the article [1] is devoted to studying partial isometries of finite rank with the Hilbert-Schmidt norm.…”

Section: Which We Call the Generalized I-stiefel Manifold Associated mentioning

confidence: 99%

Geometry of $\mathfrak {I}$-Stiefel manifolds

Chiumiento

2010

Proc. Amer. Math. Soc.

View full text Add to dashboard Cite

Abstract. Let I be a separable Banach ideal in the space of bounded operators acting in a Hilbert space H and U(H) I the Banach-Lie group of unitary operators which are perturbations of the identity by elements in I. In this paper we study the geometry of the unitary orbitswhere V is a partial isometry. We give a spatial characterization of these orbits. It turns out that both are included in V + I, and while the first one consists of partial isometries with the same kernel of V , the second is given by partial isometries such that their initial projections and V * V have null index as a pair of projections. We prove that they are smooth submanifolds of the affine Banach space V + I and homogeneous reductive spaces of U(H) I and U(H) I × U(H) I respectively. Then we endow these orbits with two equivalent Finsler metrics, one provided by the ambient norm of the ideal and the other given by the Banach quotient norm of the Lie algebra of U(H) I (or U(H) I × U(H) I ) by the Lie algebra of the isotropy group of the natural actions. We show that they are complete metric spaces with the geodesic distance of these metrics.

show abstract

Section: Which We Call the Generalized I-stiefel Manifold Associated mentioning

confidence: 99%

Geometry of $\mathfrak {I}$-Stiefel manifolds

Chiumiento

2010

Proc. Amer. Math. Soc.

View full text Add to dashboard Cite

show abstract

“…On the other hand, since we have γ(t 2 ) ∈ V R (ρ), by Remark 3.4 there exists a unique z 2 ∈ B R (0) such that L e z 2 ρ = γ(t 2 ). Using our assumption that R ≤ r, we have z 2 = z 2 , and then δ 2 is the unique geodesic in V R (ρ) joining ρ and γ(t 2 ). An easy computation shows that L q , ∞ (δ 2 ) = z 2 .…”

Section: Chiumiento Ieotmentioning

confidence: 99%

“…if two partial isometries lie closer than 1/2 in the operator norm, then they are conjugate by a pair of unitaries. In [2] was proved that each connected component, which as a consequence of local transitivity coincides with an orbit, is a homogeneous space of U M ×U M and a C ∞ submanifold of M. Hence, by Remark 2.1, to give a reductive structure we just have to prove the orthogonality condition.…”

Section: Partial Isometriesmentioning

confidence: 99%

Local Minimal Curves in Homogeneous Reductive Spaces of the Unitary Group of a Finite von Neumann Algebra

Chiumiento¹

2008

Integr. equ. oper. theory

View full text Add to dashboard Cite

We study the metric geometry of homogeneous reductive spaces of the unitary group of a finite von Neumann algebra with a non complete Riemannian metric. The main result gives an abstract sufficient condition in order that the geodesics of the Levi-Civita connection are locally minimal. Then, we show how this result applies to several examples. Mathematics Subject Classification (2000). Primary 58B20; Secondary 46L10.

show abstract

“…The action of U M on I p is locally transitive: if v, v 0 ∈ I p with v − v 0 < 1/2, then there exists a unitary valued C ∞ map ω = ω(v, v 0 ) such that ωv 0 = v (see [14,3] and [2] for an account of these facts). In the case of a general von Neumann algebra the action is not transitive.…”

Section: Introductionmentioning

confidence: 97%

Metric geometry of partial isometries in a finite von Neumann algebra

Andruchow

2008

Journal of Mathematical Analysis and Applications

View full text Add to dashboard Cite

We study the geometry of the setof partial isometries of a finite von Neumann algebra M, with initial space p (p is a projection of the algebra). This set is a C ∞ submanifold of M in the norm topology of M. However, we study it in the strong operator topology, in which it does not have a smooth structure. This topology allows for the introduction of inner products on the tangent spaces by means of a fixed trace τ in M. The quadratic norms do not define a Hilbert-Riemann metric, for they are not complete. Nevertheless certain facts can be established: a restricted result on minimality of geodesics of the Levi-Civita connection, and uniqueness of these as the only possible minimal curves. We prove also that (I p , d g ) is a complete metric space, where d g is the geodesic distance of the manifold (or the metric given by the infima of lengths of piecewise smooth curves).

show abstract

On the geometry of generalized inverses

Cited by 19 publications

References 27 publications

Geometry of $\mathfrak {I}$-Stiefel manifolds

Geometry of $\mathfrak {I}$-Stiefel manifolds

Local Minimal Curves in Homogeneous Reductive Spaces of the Unitary Group of a Finite von Neumann Algebra

Metric geometry of partial isometries in a finite von Neumann algebra

Contact Info

Product

Resources

About