Functional Deutsch Uncertainty Principle

Abstract

Let \fj\j=1n and \gk\k=1m be Parseval p-frames for a finite dimensional Banach space X. Then we show that align (1) (nm)≥ Sf (x)+Sg (x)≥ -p (y ∈ Xf Xg, \|y\|=1(1≤ j≤ n, 1≤ k≤ m|fj(y)gk(y)|)), ∀ x ∈ Xf Xg, align where align* &Xf:= \z∈ X: fj(z)≠ 0, 1≤ j ≤ n\, Xg:= \w∈ X: gk(w)≠ 0, 1≤ k ≤ m\,\\ &Sf (x):= -Σj=1n|fj(x\|x\|)|p |fj(x\|x\|)|p, Sg (x):= -Σk=1m|gk(x\|x\|)|p |gk(x\|x\|)|p, ∀ x ∈ Xg. align* We call Inequality (1) as Functional Deutsch Uncertainty Principle. For Hilbert spaces, we show that Inequality (1) reduces to the uncertainty principle obtained by Deutsch [Phys. Rev. Lett., 1983]. We also derive a dual of Inequality (1).