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Autore principale: Andruchow, Esteban
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2508.14870
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author Andruchow, Esteban
author_facet Andruchow, Esteban
contents Given an idempotent operator $E$ in a complex Hilbert space ${\mathcal H}$, one can associate to it two orthogonal projections: - The polar decomposition $2E-1=(2P-1)|2E-1|$ provides an orthogonal projection $P$. That the unitary part in the decomposition of $2E-1$ is of this form, i.e., a selfadjoint unitary operator, is a remarkable observation done by G. Corach, H. Porta and L. Recht (see references below). - The question of which, among all orthogonal projections, is the one closest in norm to $E$, provides another projection, the so called {\it matched projection} $m(E)$, which answers this question. It was found by X. Tian, Q. Xu and C. Fu (see references below). In this paper we show that these projections coincide. Moreover, we show that there exists a unique minimal geodesic of the Grassmann manifold of ${\mathcal H}$ (the manifold of closed subspaces of ${\mathcal H}$) that joins $R(E)$ and $R(E^*)$. The orthogonal projection onto the midpoint of this geodesic, also coincides with $m(E)$.
format Preprint
id arxiv_https___arxiv_org_abs_2508_14870
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle The matched projection and geodesics of the Grassmann manifold
Andruchow, Esteban
Functional Analysis
47B02, 58B20, 58BXX
Given an idempotent operator $E$ in a complex Hilbert space ${\mathcal H}$, one can associate to it two orthogonal projections: - The polar decomposition $2E-1=(2P-1)|2E-1|$ provides an orthogonal projection $P$. That the unitary part in the decomposition of $2E-1$ is of this form, i.e., a selfadjoint unitary operator, is a remarkable observation done by G. Corach, H. Porta and L. Recht (see references below). - The question of which, among all orthogonal projections, is the one closest in norm to $E$, provides another projection, the so called {\it matched projection} $m(E)$, which answers this question. It was found by X. Tian, Q. Xu and C. Fu (see references below). In this paper we show that these projections coincide. Moreover, we show that there exists a unique minimal geodesic of the Grassmann manifold of ${\mathcal H}$ (the manifold of closed subspaces of ${\mathcal H}$) that joins $R(E)$ and $R(E^*)$. The orthogonal projection onto the midpoint of this geodesic, also coincides with $m(E)$.
title The matched projection and geodesics of the Grassmann manifold
topic Functional Analysis
47B02, 58B20, 58BXX
url https://arxiv.org/abs/2508.14870