A Proof of the Riemann Hypothesis by Positivity of the Completed Arithmetic Weil Kernel
Key Points
The aim is to provide a proof of the Riemann Hypothesis by showing that the Weil quadratic form associated with the Riemann zeta function is nonnegative.
Utilized positive spectral factorization for the completed arithmetic kernel.
Analyzed the properties of the Weil quadratic form in relation to the Riemann zeta function.
Established that the Weil quadratic form is nonnegative.
Concluded that this nonnegativity provides proof for the Riemann Hypothesis.
Abstract
This paper is a proof that the Weil quadratic form for the Riemann zeta function is nonnegative, via positive spectral factorization of the completed arithmetic kernel. This implies RH.