English

Generalized frame operator distance problems

Functional Analysis 2018-12-27 v1

Abstract

Let SMd(C)+S\in\mathcal{M}_d(\mathbb{C})^+ be a positive semidefinite d×dd\times d complex matrix and let a=(ai)iIkR>0k\mathbf a=(a_i)_{i\in\mathbb{I}_k}\in \mathbb{R}_{>0}^k, indexed by Ik={1,,k}\mathbb{I}_k=\{1,\ldots,k\}, be a kk-tuple of positive numbers. Let Td(a)\mathbb T_{d}(\mathbf a ) denote the set of families G={gi}iIk(Cd)k\mathcal G=\{g_i\}_{i\in\mathbb{I}_k}\in (\mathbb{C}^d)^k such that gi2=ai\|g_i\|^2=a_i, for iIki\in\mathbb{I}_k; thus, Td(a)\mathbb T_{d}(\mathbf a ) is the product of spheres in Cd\mathbb{C}^d endowed with the product metric. For a strictly convex unitarily invariant norm NN in Md(C)\mathcal{M}_d(\mathbb{C}), we consider the generalized frame operator distance function Θ(N,S,a)\Theta_{( N \, , \, S\, , \, \mathbf a)} defined on Td(a)\mathbb T_{d}(\mathbf a ), given by Θ(N,S,a)(G)=N(SSG)whereSG=iIkgigiMd(C)+. \Theta_{( N \, , \, S\, , \, \mathbf a)}(\mathcal G) =N(S-S_{\mathcal G }) \quad \text{where} \quad S_{\mathcal G}=\sum_{i\in\mathbb{I}_k} g_i\,g_i^*\in\mathcal{M}_d(\mathbb{C})^+\,. In this paper we determine the geometrical and spectral structure of local minimizers G0Td(a)\mathcal G_0\in\mathbb T_{d}(\mathbf a ) of Θ(N,S,a)\Theta_{( N \, , \, S\, , \, \mathbf a)}. In particular, we show that local minimizers are global minimizers, and that these families do not depend on the particular choice of NN.

Keywords

Cite

@article{arxiv.1812.10365,
  title  = {Generalized frame operator distance problems},
  author = {Pedro Massey and Noelia Rios and Demetrio Stojanoff},
  journal= {arXiv preprint arXiv:1812.10365},
  year   = {2018}
}

Comments

24 pages. There exists text overlap with other arxiv manuscripts in the preliminary sections

R2 v1 2026-06-23T06:56:25.488Z