通过连续分数和二次型进行整数因式分解

arXiv - MATH - Number Theory Pub Date : 2024-09-05 DOI:arxiv-2409.03486

Nadir Murru, Giulia Salvatori

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引用次数: 0

摘要

我们提出了一种新颖的因式分解算法，该算法利用了 SQUFOF 方法的基础理论，包括还原二次型、基础距离和高斯合成。我们还对我们的方法进行了分析，它的计算复杂度为 $O \left( \exp \left(\frac{3}{\sqrt{8}} \sqrt{ln N \ln \ln N} \right) \right)$，比经典的 SQUFOF 算法和 CFRAC 算法更高效。此外，只要知道 $\mathbb{Q}(N)$ 的调节器的一个（不大的）倍数，我们的算法就是多项式时间的。

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Integer Factorization via Continued Fractions and Quadratic Forms

We propose a novel factorization algorithm that leverages the theory underlying the SQUFOF method, including reduced quadratic forms, infrastructural distance, and Gauss composition. We also present an analysis of our method, which has a computational complexity of $O \left( \exp \left( \frac{3}{\sqrt{8}} \sqrt{\ln N \ln \ln N} \right) \right)$, making it more efficient than the classical SQUFOF and CFRAC algorithms. Additionally, our algorithm is polynomial-time, provided knowledge of a (not too large) multiple of the regulator of $\mathbb{Q}(N)$.

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arXiv - MATH - Number Theory

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