Absolutely continuous restrictions of a Dirac measure and non-trivial zeros of the Riemann zeta function

Julio Alcántara-Bode

Absolutely continuous restrictions of a Dirac measure and non-trivial zeros of the Riemann zeta function

Julio Alcántara-Bode

Pontificia Universidad Católica del Perú

Research output: Contribution to journal › Article › peer-review

Abstract

It is shown that the Dirac measure δ(f)=f(1) defined on the Banach space C([0,1]) of complex valued continuous functions defined on the interval [0,1], has an absolutely continuous restriction to an infinite dimensional subspace R of C([0,1]), that is. f(1)=10l(x)f(x)dx, ∀f∈. Each non-trivial zero of the Riemann zeta function determines a different Radon-Nikodym density l∈L1([0,1]). The Riemann Hypothesis holds if and only if none of these densities belongs to L2([0,1]) or if and only if R is dense in L2([0,1]). © 2011 Académie des sciences.

Original language	Spanish
Pages (from-to)	357-359
Number of pages	3
Journal	Comptes Rendus Mathematique
Volume	349
State	Published - 1 Apr 2011

Cite this

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abstract = "It is shown that the Dirac measure δ(f)=f(1) defined on the Banach space C([0,1]) of complex valued continuous functions defined on the interval [0,1], has an absolutely continuous restriction to an infinite dimensional subspace R of C([0,1]), that is. f(1)=10l(x)f(x)dx, ∀f∈. Each non-trivial zero of the Riemann zeta function determines a different Radon-Nikodym density l∈L1([0,1]). The Riemann Hypothesis holds if and only if none of these densities belongs to L2([0,1]) or if and only if R is dense in L2([0,1]). {\textcopyright} 2011 Acad{\'e}mie des sciences.",

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N2 - It is shown that the Dirac measure δ(f)=f(1) defined on the Banach space C([0,1]) of complex valued continuous functions defined on the interval [0,1], has an absolutely continuous restriction to an infinite dimensional subspace R of C([0,1]), that is. f(1)=10l(x)f(x)dx, ∀f∈. Each non-trivial zero of the Riemann zeta function determines a different Radon-Nikodym density l∈L1([0,1]). The Riemann Hypothesis holds if and only if none of these densities belongs to L2([0,1]) or if and only if R is dense in L2([0,1]). © 2011 Académie des sciences.

AB - It is shown that the Dirac measure δ(f)=f(1) defined on the Banach space C([0,1]) of complex valued continuous functions defined on the interval [0,1], has an absolutely continuous restriction to an infinite dimensional subspace R of C([0,1]), that is. f(1)=10l(x)f(x)dx, ∀f∈. Each non-trivial zero of the Riemann zeta function determines a different Radon-Nikodym density l∈L1([0,1]). The Riemann Hypothesis holds if and only if none of these densities belongs to L2([0,1]) or if and only if R is dense in L2([0,1]). © 2011 Académie des sciences.

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JO - Comptes Rendus Mathematique

JF - Comptes Rendus Mathematique

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