Noncommutative Donoho-Stark-Elad-Bruckstein-Ricaud-Torr\'esani Uncertainty Principle
Abstract
Let \τn\n=1∞ and \ωm\m=1∞ be two modular Parseval frames for a Hilbert C*-module E. Then for every x ∈ E\0\, we show that align (1) \|θτ x \|0 \|θω x \|0 ≥ 1n, m ∈ N \| τn, ωm \|2. align We call Inequality (1) as Noncommutative Donoho-Stark-Elad-Bruckstein-Ricaud-Torr\'esani Uncertainty Principle. Inequality (1) is the noncommutative analogue of breakthrough Ricaud-Torr\'esani uncertainty principle [IEEE Trans. Inform. Theory, 2013]. In particular, Inequality (1) extends Elad-Bruckstein uncertainty principle [IEEE Trans. Inform. Theory, 2002] and Donoho-Stark uncertainty principle [SIAM J. Appl. Math., 1989].
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