Best multi-valued approximants via multi-designs
Abstract
Let be a decreasing finite sequence of positive integers, and let be a finite and non-increasing sequence of positive weights. Given a family of Bessel sequences with for each , our main purpose on this work is to characterize the best approximants of the -tuple of frame operators of the elements of in the set of the so-called -designs, which are the -tuples such that each is a finite sequence in , and for . Specifically, in this work we completely characterize the minimizers of the Joint Frame Operator Distance (JFOD) function: given by where denotes the frame operator of and is the Frobenius norm. Indeed, we show that local minimizers of are also global and we obtain an algorithm to construct the optimal -desings. As an application of the main result, in the particular case that , 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}
}