English

On the simplest quartic fields and related Thue equations

Number Theory 2010-04-20 v2

Abstract

Let KK be a field of char K2K\neq 2. For aKa\in K, we give an explicit answer to the field isomorphism problem of the simplest quartic polynomial X4aX36X2+aX+1X^4-aX^3-6X^2+aX+1 over KK as the special case of the field intersection problem via multi-resolvent polynomials. From this result, over an infinite field KK, we see that the polynomial gives the same splitting field over KK for infinitely many values aa of KK. We also see by Siegel's theorem for curves of genus zero that only finitely many algebraic integers aOKa\in\mathcal{O}_K in a number field KK may give the same splitting field. By applying the result over the field Q\mathbb{Q} of rational numbers, we establish a correspondence between primitive solutions to the parametric family of quartic Thue equations X4mX3Y6X2Y2+mXY3+Y4=c, X^4-mX^3Y-6X^2Y^2+mXY^3+Y^4=c, where mZm\in\mathbb{Z} is a rational integer and cc is a divisor of 4(m2+16)4(m^2+16), and isomorphism classes of the simplest quartic fields.

Keywords

Cite

@article{arxiv.1004.1960,
  title  = {On the simplest quartic fields and related Thue equations},
  author = {Akinari Hoshi},
  journal= {arXiv preprint arXiv:1004.1960},
  year   = {2010}
}

Comments

17 pages, 3 tables, modified Theorem 8.1 and added 2 references

R2 v1 2026-06-21T15:09:21.870Z