On the Finiteness of Hyperelliptic Fields with Special Properties and Periodic Expansion of √ f

V. P. Platonov; V. S. Zhgoon; M. M. Petrunin; Yu. N. Shteinikov

doi:10.1134/S1064562418070281

On the Finiteness of Hyperelliptic Fields with Special Properties and Periodic Expansion of √f

Authors: Platonov V.P.¹, Zhgoon V.S.¹, Petrunin M.M.¹, Shteinikov Y.N.¹
Affiliations:
1. Scientific Research Institute for System Analysis
Issue: Vol 98, No 3 (2018)
Pages: 641-645
Section: Mathematics
URL: https://journal-vniispk.ru/1064-5624/article/view/225603
DOI: https://doi.org/10.1134/S1064562418070281
ID: 225603

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Abstract

We prove the finiteness of the set of square-free polynomials f ∈ k[x] of odd degree distinct from 11 considered up to a natural equivalence relation for which the continued fraction expansion of the irrationality \(\sqrt {f\left( x \right)} \) in k((x)) is periodic and the corresponding hyperelliptic field k(x)(√f) contains an S-unit of degree 11. Moreover, it was proved for k = ℚ that there are no polynomials of odd degree distinct from 9 and 11 satisfying the conditions mentioned above.

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On the Finiteness of Hyperelliptic Fields with Special Properties and Periodic Expansion of √f

Full Text

Abstract

About the authors

V. P. Platonov

V. S. Zhgoon

M. M. Petrunin

Yu. N. Shteinikov

Supplementary files