English

Best multi-valued approximants via multi-designs

Functional Analysis 2023-04-21 v2

Abstract

Let d=(dj)jImNm{\mathbf d} =(d_j)_{j\in\mathbb{I}_m}\in \mathbb{N}^m be a decreasing finite sequence of positive integers, and let α=(αi)iIn\alpha=(\alpha_i)_{i\in\mathbb{I}_n} be a finite and non-increasing sequence of positive weights. Given a family Φ0=(Fj0)jIm\Phi^0=(\mathcal{F}_j^0)_{j\in\mathbb{I}_m} of Bessel sequences with Fj0={fi,j0}iIk(Cdj)k\mathcal{F}_j^0=\{f_{i,j}^0\}_{i\in \mathbb{I}_k}\in (\mathbb{C}^{d_j})^k for each 1jm1\leq j\leq m, our main purpose on this work is to characterize the best approximants of the mm-tuple of frame operators of the elements of Φ0\Phi^0 in the set D(α,d)D(\alpha,\mathbf d) of the so-called (α,d)(\alpha,\mathbf d)-designs, which are the mm-tuples Φ=(Fj)jIm\Phi=(\mathcal{F}_j)_{j\in\mathbb{I}_m} such that each Fj={fi,j}iIn\mathcal{F}_j=\{f_{i,j}\}_{i\in\mathbb{I}_n} is a finite sequence in Cdj\mathbb{C}^{d_j}, and jImfi,j2=αi\sum_{j\in\mathbb{I}_m}\|f_{i,j}\|^2=\alpha_i for iIni\in\mathbb{I}_n. Specifically, in this work we completely characterize the minimizers of the Joint Frame Operator Distance (JFOD) function: Θ:D(α,d)R0\Theta:D(\alpha,\mathbf d)\to \mathbb{R}_{\geq 0} given by Θ(Φ)=j=1mSFjSFj022,\Theta(\Phi)=\sum_{j=1}^m \| S_{\mathcal{F}_j} - S_{\mathcal{F}^0_j}\|_2^2 \,, where SFS_{\mathcal{F}} denotes the frame operator of F\mathcal{F} and 2\|\cdot\|_2 is the Frobenius norm. Indeed, we show that local minimizers of Θ\Theta are also global and we obtain an algorithm to construct the optimal (α,d)(\alpha,\mathbf d)-desings. As an application of the main result, in the particular case that m=1m=1, we also characterize global minimizers of a G-frames problem recently considered by He, Leng and Xu.

Cite

@article{arxiv.2212.12004,
  title  = {Best multi-valued approximants via multi-designs},
  author = {María José Benac and Noelia Belén Rios and Mariano Ruiz},
  journal= {arXiv preprint arXiv:2212.12004},
  year   = {2023}
}
R2 v1 2026-06-28T07:49:39.264Z