On the Irreducibility of Polynomials Associated with the Complete Residue Systems in any Imaginary Quadratic Fields

On the Irreducibility of Polynomials Associated with the Complete Residue Systems in any Imaginary Quadratic Fields

For a Gaussian prime π and a nonzero Gaussian integer β=a+bi∈ℤi with a≥1 and β≥2+2, it was proved that if π=αnβn+αn−1βn−1+⋯+α1β+α0≕fβ where n≥1, αn∈ℤi\0, α0,…,αn−1 belong to a complete residue system modulo β, and the digits αn−1 and αn satisfy certain restrictions, then the polynomial fx is irreduc...

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Main Authors: Phitthayathon Phetnun, Narakorn Rompurk Kanasri, Patiwat Singthongla
Format: Article
Language:English
Published: Hindawi Limited 2021-01-01
Series:International Journal of Mathematics and Mathematical Sciences
Online Access:http://dx.doi.org/10.1155/2021/5564589
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spelling doaj-74876d8242cc449c8dca0a7f094f9f6e2021-05-03T00:01:33ZengHindawi LimitedInternational Journal of Mathematics and Mathematical Sciences1687-04252021-01-01202110.1155/2021/5564589On the Irreducibility of Polynomials Associated with the Complete Residue Systems in any Imaginary Quadratic FieldsPhitthayathon Phetnun0Narakorn Rompurk Kanasri1Patiwat Singthongla2Department of MathematicsDepartment of MathematicsDepartment of MathematicsFor a Gaussian prime π and a nonzero Gaussian integer β=a+bi∈ℤi with a≥1 and β≥2+2, it was proved that if π=αnβn+αn−1βn−1+⋯+α1β+α0≕fβ where n≥1, αn∈ℤi\0, α0,…,αn−1 belong to a complete residue system modulo β, and the digits αn−1 and αn satisfy certain restrictions, then the polynomial fx is irreducible in ℤix. For any quadratic field K≔ℚm, it is well known that there are explicit representations for a complete residue system in K, but those of the case m≡1 mod4 are inapplicable to this work. In this article, we establish a new complete residue system for such a case and then generalize the result mentioned above for the ring of integers of any imaginary quadratic field.http://dx.doi.org/10.1155/2021/5564589
collection DOAJ
language English
format Article
sources DOAJ
author Phitthayathon Phetnun
Narakorn Rompurk Kanasri
Patiwat Singthongla
spellingShingle Phitthayathon Phetnun
Narakorn Rompurk Kanasri
Patiwat Singthongla
On the Irreducibility of Polynomials Associated with the Complete Residue Systems in any Imaginary Quadratic Fields
International Journal of Mathematics and Mathematical Sciences
author_facet Phitthayathon Phetnun
Narakorn Rompurk Kanasri
Patiwat Singthongla
author_sort Phitthayathon Phetnun
title On the Irreducibility of Polynomials Associated with the Complete Residue Systems in any Imaginary Quadratic Fields
title_short On the Irreducibility of Polynomials Associated with the Complete Residue Systems in any Imaginary Quadratic Fields
title_full On the Irreducibility of Polynomials Associated with the Complete Residue Systems in any Imaginary Quadratic Fields
title_fullStr On the Irreducibility of Polynomials Associated with the Complete Residue Systems in any Imaginary Quadratic Fields
title_full_unstemmed On the Irreducibility of Polynomials Associated with the Complete Residue Systems in any Imaginary Quadratic Fields
title_sort on the irreducibility of polynomials associated with the complete residue systems in any imaginary quadratic fields
publisher Hindawi Limited
series International Journal of Mathematics and Mathematical Sciences
issn 1687-0425
publishDate 2021-01-01
description For a Gaussian prime π and a nonzero Gaussian integer β=a+bi∈ℤi with a≥1 and β≥2+2, it was proved that if π=αnβn+αn−1βn−1+⋯+α1β+α0≕fβ where n≥1, αn∈ℤi\0, α0,…,αn−1 belong to a complete residue system modulo β, and the digits αn−1 and αn satisfy certain restrictions, then the polynomial fx is irreducible in ℤix. For any quadratic field K≔ℚm, it is well known that there are explicit representations for a complete residue system in K, but those of the case m≡1 mod4 are inapplicable to this work. In this article, we establish a new complete residue system for such a case and then generalize the result mentioned above for the ring of integers of any imaginary quadratic field.
url http://dx.doi.org/10.1155/2021/5564589
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AT narakornrompurkkanasri ontheirreducibilityofpolynomialsassociatedwiththecompleteresiduesystemsinanyimaginaryquadraticfields
AT patiwatsingthongla ontheirreducibilityofpolynomialsassociatedwiththecompleteresiduesystemsinanyimaginaryquadraticfields
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