Continuous Rankin Bound for Hilbert and Banach Spaces

Abstract

Let (, μ) be a measure space and \τα\α∈ be a normalized continuous Bessel family for a real Hilbert space H. If the diagonal := \(α, α):α ∈ \ is measurable in the measure space × , then we show that align (1) α, β ∈ , α≠ β τα, τβ ≥ -(μ×μ)()(μ×μ)((×)). align We call Inequality (1) as continuous Rankin bound. It improves 76 years old result of Rankin [Ann. of Math., 1947]. It also answers one of the questions asked by K. M. Krishna in the paper [Continuous Welch bounds with applications, Commun. Korean Math. Soc., 2023]. We also derive Banach space version of Inequality (1).

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