Biquadratic equations over p-adic fields

In this paper, we study a bi-quadratic equation x^4 + ax^2 = b over p-adic fields Q_p. It is worth of mentioning that the bi-quadratic equation x^4 + 1 = 0 is not solvable in the real number field R. However, the same bi-quadratic equation x^4 + 1 = 0 is solvable some p-adic fields such as p = 17,...

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Main Authors:	Saburov, Mansoor, Ahmad, Mohd Ali Khameini
Format:	Conference or Workshop Item
Language:	English
Published:	2014
Subjects:	QA Mathematics
Online Access:	http://irep.iium.edu.my/39875/ http://irep.iium.edu.my/39875/ http://irep.iium.edu.my/39875/1/Biquadratic_Equation_--_IREP.pdf

id	iium-39875
recordtype	eprints
spelling	iium-398752018-06-18T15:21:30Z http://irep.iium.edu.my/39875/ Biquadratic equations over p-adic fields Saburov, Mansoor Ahmad, Mohd Ali Khameini QA Mathematics In this paper, we study a bi-quadratic equation x^4 + ax^2 = b over p-adic fields Q_p. It is worth of mentioning that the bi-quadratic equation x^4 + 1 = 0 is not solvable in the real number field R. However, the same bi-quadratic equation x^4 + 1 = 0 is solvable some p-adic fields such as p = 17, 41, ... Therefore, it is of independent interest to provide a solvability criterion of a bi-quadratic equation over p-adic fields. In this paper, we shall provide a solvability criterion of bi-quadratic equations in terms of a,b. 2014-09-23 Conference or Workshop Item PeerReviewed application/pdf en http://irep.iium.edu.my/39875/1/Biquadratic_Equation_--_IREP.pdf Saburov, Mansoor and Ahmad, Mohd Ali Khameini (2014) Biquadratic equations over p-adic fields. In: 3rd International Conference on Mathematical Applications in Engineering (ICMAE'14), 23-25 Sep 2014, Kuala Lumpur. (Unpublished) http://www.iium.edu.my/icmae/14/
repository_type	Digital Repository
institution_category	Local University
institution	International Islamic University Malaysia
building	IIUM Repository
collection	Online Access
language	English
topic	QA Mathematics
spellingShingle	QA Mathematics Saburov, Mansoor Ahmad, Mohd Ali Khameini Biquadratic equations over p-adic fields
description	In this paper, we study a bi-quadratic equation x^4 + ax^2 = b over p-adic fields Q_p. It is worth of mentioning that the bi-quadratic equation x^4 + 1 = 0 is not solvable in the real number field R. However, the same bi-quadratic equation x^4 + 1 = 0 is solvable some p-adic fields such as p = 17, 41, ... Therefore, it is of independent interest to provide a solvability criterion of a bi-quadratic equation over p-adic fields. In this paper, we shall provide a solvability criterion of bi-quadratic equations in terms of a,b.
format	Conference or Workshop Item
author	Saburov, Mansoor Ahmad, Mohd Ali Khameini
author_facet	Saburov, Mansoor Ahmad, Mohd Ali Khameini
author_sort	Saburov, Mansoor
title	Biquadratic equations over p-adic fields
title_short	Biquadratic equations over p-adic fields
title_full	Biquadratic equations over p-adic fields
title_fullStr	Biquadratic equations over p-adic fields
title_full_unstemmed	Biquadratic equations over p-adic fields
title_sort	biquadratic equations over p-adic fields
publishDate	2014
url	http://irep.iium.edu.my/39875/ http://irep.iium.edu.my/39875/ http://irep.iium.edu.my/39875/1/Biquadratic_Equation_--_IREP.pdf
first_indexed	2023-09-18T20:57:15Z
last_indexed	2023-09-18T20:57:15Z
_version_	1777410386258034688

Biquadratic equations over p-adic fields

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