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MONOGENITY OF THE COMPOSITION OF POLYNOMIALS

Part of: Algebraic number theory: global fields

Published online by Cambridge University Press:  08 May 2025

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Abstract

One of the important problems in algebraic number theory is to study the monogenity of number fields. Monogenic number fields arise from the roots of monogenic polynomials. In this article, we deal with the problem of monogenity of the composition of two monic polynomials having integer coefficients. We provide necessary and sufficient conditions for the composition to be monogenic together with a further sufficient condition. At the end of the paper, we construct an infinite tower of monogenic number fields.

Keywords

monogenitydiscriminantresultant

MSC classification

Primary: 11R04: Algebraic numbers; rings of algebraic integers
Secondary: 11R21: Other number fields
Type
Research Article
Information
Bulletin of the Australian Mathematical Society , First View , pp. 1 - 9
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Copyright
© The Author(s), 2025. Published by Cambridge University Press on behalf of Australian Mathematical Publishing Association Inc.

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References

Gaál, I., Diophantine Equations and Power Integral Bases (Birkhäuser, Boston, MA, 2002).CrossRefGoogle Scholar
Gaál, I., ‘On the monogenity of certain binomial compositions’, JP J. Algebra Number Theory Appl. 57 (2022), 116.Google Scholar
Harrington, J. and Jones, L., ‘Monogenic binomial composition’, Taiwanese J. Math. 24 (2020), Article no. 10731090.CrossRefGoogle Scholar
Jhorar, B. and Khanduja, S. K., ‘When is $R[\theta]$ integrally closed?’, J. Algebra Appl. 15(5) (2016), Article no. 1650091, 7 pages.Google Scholar
Jones, L., ‘A brief note on some infinite families of monogenic polynomials’, Bull. Aust. Math. Soc. 100 (2019), 239244.CrossRefGoogle Scholar
Jones, L., ‘Some new infinite families of monogenic polynomials with non-square free discriminant’, Acta Arith. 197(2) (2021), 213219.CrossRefGoogle Scholar
Kaur, S. and Kumar, S., ‘On a conjecture of Lenny Jones about certain monogenic polynomials’, Bull. Aust. Math. Soc. 110 (2024), 7276.CrossRefGoogle Scholar
Kaur, S., Kumar, S. and Remete, L., ‘On the index of power compositional polynommials’, Preprint, 2024, arXiv.2404.17351.Google Scholar
Khanduja, S. K., A Textbook of Algebraic Number Theory, Unitext, 135 (Springer, Singapore, 2022).CrossRefGoogle Scholar
Narkiewicz, W., Elementary and Analytic Theory of Algebraic Numbers, 3rd edn (Springer, Berlin–Heidelberg, 2004).CrossRefGoogle Scholar
Sharma, H., Sharma, R. and Laishram, S., ‘Monogenity of iterates of polynomials’, Arch. Math. 122 (2024), 295305.CrossRefGoogle Scholar
Tschebotaröw, N. G., Grundzüge der Galois’schen Theorie (Noordhoff, Groningen, 1950); translated from Russian by H. Schwerdtfeger.Google Scholar
Uchida, K., ‘When is $\mathbb{Z}[\theta]$ the ring of integers?’, Osaka J. Math. 14 (1977), 155157.Google Scholar