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Toeplitz Operators with Fractal Symbols and the Hilbert-Pólya Conjecture: A Spectral Approach to the Riemann Hypothesis

We investigate the spectral asymptotics of Toeplitz operators defined on the Hardy space of the unit circle, where the symbol is supported on a Cantor-type fractal set.

Abstract

We investigate the spectral asymptotics of Toeplitz operators defined on the Hardy space of the unit circle, where the symbol is supported on a Cantor-type fractal set.


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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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