Continuous Deutsch Uncertainty Principle and Continuous Kraus Conjecture

Abstract

Let (, μ), (, ) be measure spaces and \τα\α∈ , \ωβ\β ∈ be 1-bounded continuous Parseval frames for a Hilbert space H. Then we show that align (1) (μ()())≥ Sτ(h)+Sω (h)≥ -2 (1+ α ∈ , β ∈ |τα , ωβ|2) , ∀ h ∈ Hτ Hω, align where align* &Hτ := \h1 ∈ H: h1 , τα ≠ 0, α ∈ \, Hω := \h2 ∈ H: h2, ωβ ≠ 0, β ∈ \,\\ &Sτ(h):= -∫| h\|h\|, τα |2 | h\|h\|, τα |2\,dμ(α), ∀ h ∈ Hτ, \\ & Sω (h):= -∫| h\|h\|, ωβ |2 | h\|h\|, ωβ |2\,d(β), ∀ h ∈ Hω. align* We call Inequality (1) as Continuous Deutsch Uncertainty Principle. Inequality (1) improves the uncertainty principle obtained by Deutsch [Phys. Rev. Lett., 1983]. We formulate Kraus conjecture for 1-bounded continuous Parseval frames. We also derive continuous Deutsch uncertainty principles for Banach spaces.

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