English

Weighted Procrustes problems

Functional Analysis 2016-10-04 v1

Abstract

Let H\mathcal{H} be a Hilbert space, L(H)L(\mathcal{H}) the algebra of bounded linear operators on H\mathcal{H} and WL(H)W \in L(\mathcal{H}) a positive operator such that W1/2W^{1/2} is in the p-Schatten class, for some 1p<.1 \leq p< \infty. Given AL(H)A \in L(\mathcal{H}) with closed range and BL(H),B \in L(\mathcal{H}), we study the following weighted approximation problem: analize the existence of minXL(H)AXBp,W,\underset{X \in L(\mathcal{H})}{min}\Vert AX-B \Vert_{p,W}, where Xp,W=W1/2Xp.\Vert X \Vert_{p,W}=\Vert W^{1/2}X \Vert_{p}. In this paper we prove that the existence of this minimum is equivalent to a compatibility condition between R(B)R(B) and R(A)R(A) involving the weight W,W, and we characterize the operators which minimize this problem as WW-inverses of AA in R(B).R(B).

Keywords

Cite

@article{arxiv.1610.00558,
  title  = {Weighted Procrustes problems},
  author = {Maximiliano Contino and Juan Giribet and Alejandra Maestripieri},
  journal= {arXiv preprint arXiv:1610.00558},
  year   = {2016}
}
R2 v1 2026-06-22T16:08:48.843Z