English

Simultaneous Convergent Continued Fraction Algorithm for Real and $p$-adic Fields with Applications to Quadratic Fields

Number Theory 2023-09-19 v1

Abstract

Let pp be a prime number and KK be a field with embeddings into R\mathbb{R} and Qp\mathbb{Q}_p. We propose an algorithm that generates continued fraction expansions converging in Qp\mathbb{Q}_p and is expected to simultaneously converge in both R\mathbb{R} and Qp\mathbb{Q}_p. This algorithm produces finite continued fraction expansions for rational numbers. In the case of p=2p=2 and if KK is a quadratic field, the continued fraction expansions generated by this algorithm converge in R\mathbb{R}, and they are eventually periodic or finite. For an element α\alpha in KK, let pn/qnp_n/q_n denote the nn-th convergent. There exist constants u1u_1 and u2u_2 in R>0{\mathbb R}_{>0} with u1+u2=2u_1 + u_2 = 2, and constants C1C_1 and C2C_2 in R>0{\mathbb R}_{>0} such that αpn/qn<C1/qnu1|\alpha - p_n/q_n| < C_1/|q_n|^{u_1} and αpn/qn2<C2/qnu2|\alpha - p_n/q_n|_2 < C_2/|q_n|^{u_2}. Here, 2|\cdot|_2 represents the 22-adic distance. For prime numbers p>2p > 2, we present numerical experiences.

Keywords

Cite

@article{arxiv.2309.09447,
  title  = {Simultaneous Convergent Continued Fraction Algorithm for Real and $p$-adic Fields with Applications to Quadratic Fields},
  author = {Shin-ichi Yasutomi},
  journal= {arXiv preprint arXiv:2309.09447},
  year   = {2023}
}

Comments

36 pages

R2 v1 2026-06-28T12:24:16.434Z