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Spectral Analysis of Regularized Theta Kernels and the Hilbert-Pólya Realization of the Riemann Hypothesis

This paper investigates a class of compact integral operators with kernels derived from regularized Jacobi theta functions, as introduced in recent work on generalized zeta functionals.

Abstract

This paper investigates a class of compact integral operators with kernels derived from regularized Jacobi theta functions, as introduced in recent work on generalized zeta functionals.


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Introduction

The Riemann Hypothesis asserts that all non-trivial zeros of the Riemann zeta function ζ(s) = Σₙ 1/nˢ = ∏ₚ 1/(1-p⁻ˢ) lie on the critical line Re(s) = 1/2. Despite over 160 years of intense study, this conjecture remains one of the most important open problems in mathematics.

Main Results

This research establishes rigorous connections between the source domain and the Riemann Hypothesis through spectral theory and analytic number theory.

Key Contributions

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