Large-Nc QCD, Harmonic Sums and the Riemann Zeros
Eduardo de Rafael
TL;DR
This paper explores the connection between Large-Nc QCD, harmonic sums, and the zeros of the Riemann zeta function, revealing new insights into their mathematical and physical properties.
Contribution
It demonstrates that two-point functions in Large-Nc QCD are harmonic sums and discusses implications for the Riemann zeta zeros from a quantum dispersion relation perspective.
Findings
Two-point functions in Large-Nc QCD are harmonic sums
Properties of harmonic sums relate to Riemann zeta zeros
Quantum dispersion relations offer insights into zeta zeros
Abstract
It is shown that in Large-Nc QCD, two--point functions of local operators become Harmonic Sums. We comment on the properties which follow from this fact. This has led us to an aside observation concerning the zeros of the Riemann zeta--function seen from the point of view of Dispersion Relations in Quantum Theory.
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