Minimal sequences and the Kadison-Singer problem
Abstract
The Kadison-Singer problem asks: does every pure state on the diagonal sublgebra of the C*-algebra of bounded operators on a separable infinite dimensional Hilbert space admit a unique extension? A yes answer is equivalent to several open conjectures including Feichtinger's: every bounded frame is a finite union of Riesz sequences. We consider the special case: Feichtinger's conjecture for exponentials and prove that the set of projections onto a measurable subset of the circle group of the set of exponential functions equals a union of a finite number of Reisz sequences if and only if there exists a Reisz subsequence corresponding to integers whose characteristic function is a nonzero minimal sequence.
Cite
@article{arxiv.0911.5559,
title = {Minimal sequences and the Kadison-Singer problem},
author = {W. Lawton},
journal= {arXiv preprint arXiv:0911.5559},
year = {2009}
}
Comments
10 pages, Theorem 1.1 was announced during conferences in St. Petersburg, Russia, June 14-20, 2009, and in Kuala Lumpur, Malaysia, June 22-26, 2009