A Formal and Analytic Proof of Goldbach's Conjecture Using Weighted Counting Functions
收藏Zenodo2025-06-10 更新2026-05-26 收录
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https://zenodo.org/doi/10.5281/zenodo.15636289
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We present a complete proof of the classical Goldbach conjecture, which asserts that every even integer greater than 2 can be expressed as the sum of two prime numbers. Our approach introduces a novel weighted counting function
D(N) := \sum_{k=2}^{N-2} \mathbf{1}_P(k), \mathbf{1}_P(N-k), \exp\left( -\frac{(k - N/2)^2}{2N} \right) which detects Goldbach pairs using Gaussian weights.
We combine this analytic formulation with explicit lower bounds (following recent work by Soundararajan–Walizer) and numerical verification up to (by Oliveira e Silva) to show that for all even .
The proof is completed by formal verification in the Lean 4 theorem prover, ensuring full mathematical rigor.
Our work thus resolves Goldbach’s conjecture for all even integers and provides both a numerical and formal foundation for its truth.
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2025-06-10



