High-precision numerical computations demonstrate that the zeros of the ground state of the truncated Weil form converge to the Riemann zeros with errors decreasing by over 100 orders of magnitude as the cutoff increases from 13 to 67.
Zeta spectral triples.arXiv preprint arXiv:2511.22755 [math.NT]
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A framework via the screw function unifies work on the Weil quadratic form and yields a conjecture on a spectral operator for the imaginary parts of nontrivial zeta zeros, without assuming the Riemann hypothesis.
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High-Precision Approximation of Riemann Zeros via the Truncated Weil Form
High-precision numerical computations demonstrate that the zeros of the ground state of the truncated Weil form converge to the Riemann zeros with errors decreasing by over 100 orders of magnitude as the cutoff increases from 13 to 67.
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Weil's quadratic form via the screw function
A framework via the screw function unifies work on the Weil quadratic form and yields a conjecture on a spectral operator for the imaginary parts of nontrivial zeta zeros, without assuming the Riemann hypothesis.