史泰纳-雷穆斯定理的机器检验的直接证明

Proceedings of the 11th ACM SIGPLAN International Conference on Certified Programs and Proofs Pub Date : 2021-12-18 DOI:10.1145/3497775.3503682

Ariel E. Kellison

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引用次数: 0

摘要

史泰纳-雷穆斯定理的直接证明已经困扰几何学者170多年了。挑战在于，一个证明只有在不依赖于归谬法的情况下才被认为是直接的。因此，任何声称是直接的证明必须表明，回到公理，所有使用的辅助定理也都是直接证明的。本文给出了Steiner-Lehmus定理的一个证明，它保证是直接的。这一论断的证据来源于我们的方法论:我们在一个实现构造逻辑的证明助手中形式化了欧几里得平面几何的构造公理集，并在此构造基础上建立了斯坦纳-莱姆斯定理的证明。

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A machine-checked direct proof of the Steiner-lehmus theorem

A direct proof of the Steiner-Lehmus theorem has eluded geometers for over 170 years. The challenge has been that a proof is only considered direct if it does not rely on reductio ad absurdum. Thus, any proof that claims to be direct must show, going back to the axioms, that all of the auxiliary theorems used are also proved directly. In this paper, we give a proof of the Steiner-Lehmus theorem that is guaranteed to be direct. The evidence for this claim is derived from our methodology: we have formalized a constructive axiom set for Euclidean plane geometry in a proof assistant that implements a constructive logic and have built the proof of the Steiner-Lehmus theorem on this constructive foundation.

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Proceedings of the 11th ACM SIGPLAN International Conference on Certified Programs and Proofs

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