On index and monogenity of certain number fields defined by trinomials
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Publication:6175358
DOI10.1515/ms-2023-0063zbMath1524.11190arXiv2203.13353OpenAlexW4385578192MaRDI QIDQ6175358
Publication date: 18 August 2023
Published in: Mathematica Slovaca (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2203.13353
Other number fields (11R21) Algebraic number theory computations (11Y40) Algebraic numbers; rings of algebraic integers (11R04)
Cites Work
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- On a theorem of Ore
- On a problem of Hasse for certain imaginary Abelian fields
- On monogenity of certain number fields defined by trinomials
- Monogenic fields arising from trinomials
- On non monogenity of certain number fields defined by trinomials \(x^6 + ax^3 + b\)
- On certain pure sextic fields related to a problem of Hasse
- On power basis of a class of algebraic number fields
- On the indices of multiquadratic number fields
- NEWTON POLYGONS AND p-INTEGRAL BASES OF QUARTIC NUMBER FIELDS
- Infinite families of non-monogenic trinomials
- The index of a quartic field defined by a trinomial X4 + aX + b
- Infinite families of monogenic trinomials and their Galois groups
- Characterization of primes dividing the index of a trinomial
- Monogenic trinomials with non-squarefree discriminant
- AN EXPERIMENT ON THE MONOGENITY OF A FAMILY OF TRINOMIALS
- On common index divisors and monogenity of certain number fields defined by x5 + ax2 + b
- On power integral bases of certain pure number fields defined by $x^{3^r\cdot 7^s}-m$
- On nonmonogenic number fields defined by
- On Newton polygons techniques and factorization of polynomials over Henselian fields
- Diophantine Equations and Power Integral Bases
- Newton polygons of higher order in algebraic number theory
- A Note on Common Index Divisors
- Some new infinite families of monogenic polynomials with non-squarefree discriminant
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