English

Integral Basis for quartic Kummer extensions over $\mathbb{Z}[\iota]$

Number Theory 2024-10-24 v1

Abstract

Let K=Q[ι]K=\mathbb{Q}[\iota] and N=K[α4]N=K[\sqrt[4]{\alpha}], αZ[ι]\alpha\in\mathbb{Z}[\iota], alpha=fg2h3alpha=fg^2h^3, ff, gg, hZ[ι]h\in \mathbb{Z}[\iota] are pairwise coprime and square free. Let ON\mathcal{O}_N be the ring of integers of NN. In this article we construct normalised integral basis for ON\mathcal{O}_N over Z[ι]\mathbb{Z}[\iota], that is an integral basis of the form {1,f1(α)d1,f2(α)d2,f3(α)d3} \left\{1,\frac{f_1(\alpha)}{d_1},\frac{f_2(\alpha)}{d_2},\frac{f_{3}(\alpha)}{d_3}\right\} where diZ[i]d_i \in \mathbb{Z}[i] and fi(X)f_i(X), i3\leq i\leq 3 are monic polynomials of degree ii over Z[ι]\mathbb{Z}[\iota]. We explicitly determine what did_i, 1in11\leq i\leq n-1 are in terms of ff, gg and hh.

Keywords

Cite

@article{arxiv.2410.17560,
  title  = {Integral Basis for quartic Kummer extensions over $\mathbb{Z}[\iota]$},
  author = {S. Venkataraman and Manisha V. Kulkarni},
  journal= {arXiv preprint arXiv:2410.17560},
  year   = {2024}
}

Comments

29 pages

R2 v1 2026-06-28T19:32:24.683Z