Optimal dual frames and frame completions for majorization
Abstract
In this paper we consider two problems in frame theory. On the one hand, given a set of vectors we describe the spectral and geometrical structure of optimal completions of by a finite family of vectors with prescribed norms, where optimality is measured with respect to majorization. In particular, these optimal completions are the minimizers of a family of convex functionals that include the mean square error and the Bendetto-Fickus' frame potential. On the other hand, given a fixed frame we describe explicitly the spectral and geometrical structure of optimal frames that are in duality with and such that the Frobenius norms of their analysis operators is bounded from below by a fixed constant. In this case, optimality is measured with respect to submajorization of the frames operators. Our approach relies on the description of the spectral and geometrical structure of matrices that minimize submajorization on sets that are naturally associated with the problems above.
Cite
@article{arxiv.1108.4412,
title = {Optimal dual frames and frame completions for majorization},
author = {Pedro G. Massey and Mariano A. Ruiz and Demetrio Stojanoff},
journal= {arXiv preprint arXiv:1108.4412},
year = {2012}
}
Comments
29 pages, with modifications related with the exposition of the material