On px2+q2n=yp and related Diophantine equations

A. Laradji; M. Mignotte; N. Tzanakis

doi:10.1016/j.jnt.2011.02.007

On px2+q2n=yp and related Diophantine equations

A. Laradji^*
, M. Mignotte
, N. Tzanakis

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

7 Scopus citations

Abstract

The title equation, where p>3 is a prime number ≢7(mod8), q is an odd prime number and x, y, n are positive integers with x, y relatively prime, is studied. When p≡3(mod8), we prove (Theorem 2.3) that there are no solutions. For p≢3(mod8) the treatment of the equation turns out to be a difficult task. We focus our attention to p=5, by reason of an article by F. Abu Muriefah, published in J. Number Theory 128 (2008) 1670-1675. Our main result concerning this special equation is Theorem 1.1, whose proof is based on results around the Diophantine equation 5x2-4=yn (integer solutions), interesting in themselves, which are exposed in Sections 3 and 4. These last results are obtained by using tools such as linear forms in two logarithms and hypergeometric series.

Original language	English
Pages (from-to)	1575-1596
Number of pages	22
Journal	Journal of Number Theory
Volume	131
Issue number	9
DOIs	https://doi.org/10.1016/j.jnt.2011.02.007
State	Published - Sep 2011

Keywords

Cyclotomic polynomial
Exponential Diophantine equation
Hypergeometric series
Lehmer pair
Linear forms in two logarithms

ASJC Scopus subject areas

Algebra and Number Theory

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10.1016/j.jnt.2011.02.007

Cite this

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title = "On px2+q2n=yp and related Diophantine equations",

abstract = "The title equation, where p>3 is a prime number ≢7(mod8), q is an odd prime number and x, y, n are positive integers with x, y relatively prime, is studied. When p≡3(mod8), we prove (Theorem 2.3) that there are no solutions. For p≢3(mod8) the treatment of the equation turns out to be a difficult task. We focus our attention to p=5, by reason of an article by F. Abu Muriefah, published in J. Number Theory 128 (2008) 1670-1675. Our main result concerning this special equation is Theorem 1.1, whose proof is based on results around the Diophantine equation 5x2-4=yn (integer solutions), interesting in themselves, which are exposed in Sections 3 and 4. These last results are obtained by using tools such as linear forms in two logarithms and hypergeometric series.",

keywords = "Cyclotomic polynomial, Exponential Diophantine equation, Hypergeometric series, Lehmer pair, Linear forms in two logarithms",

author = "A. Laradji and M. Mignotte and N. Tzanakis",

year = "2011",

month = sep,

doi = "10.1016/j.jnt.2011.02.007",

language = "English",

volume = "131",

pages = "1575--1596",

journal = "Journal of Number Theory",

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TY - JOUR

T1 - On px2+q2n=yp and related Diophantine equations

AU - Laradji, A.

AU - Mignotte, M.

AU - Tzanakis, N.

PY - 2011/9

Y1 - 2011/9

N2 - The title equation, where p>3 is a prime number ≢7(mod8), q is an odd prime number and x, y, n are positive integers with x, y relatively prime, is studied. When p≡3(mod8), we prove (Theorem 2.3) that there are no solutions. For p≢3(mod8) the treatment of the equation turns out to be a difficult task. We focus our attention to p=5, by reason of an article by F. Abu Muriefah, published in J. Number Theory 128 (2008) 1670-1675. Our main result concerning this special equation is Theorem 1.1, whose proof is based on results around the Diophantine equation 5x2-4=yn (integer solutions), interesting in themselves, which are exposed in Sections 3 and 4. These last results are obtained by using tools such as linear forms in two logarithms and hypergeometric series.

AB - The title equation, where p>3 is a prime number ≢7(mod8), q is an odd prime number and x, y, n are positive integers with x, y relatively prime, is studied. When p≡3(mod8), we prove (Theorem 2.3) that there are no solutions. For p≢3(mod8) the treatment of the equation turns out to be a difficult task. We focus our attention to p=5, by reason of an article by F. Abu Muriefah, published in J. Number Theory 128 (2008) 1670-1675. Our main result concerning this special equation is Theorem 1.1, whose proof is based on results around the Diophantine equation 5x2-4=yn (integer solutions), interesting in themselves, which are exposed in Sections 3 and 4. These last results are obtained by using tools such as linear forms in two logarithms and hypergeometric series.

KW - Cyclotomic polynomial

KW - Exponential Diophantine equation

KW - Hypergeometric series

KW - Lehmer pair

KW - Linear forms in two logarithms

UR - https://www.scopus.com/pages/publications/79953862886

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DO - 10.1016/j.jnt.2011.02.007

M3 - Article

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SN - 0022-314X

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SP - 1575

EP - 1596

JO - Journal of Number Theory

JF - Journal of Number Theory

IS - 9

ER -

On px2+q2n=yp and related Diophantine equations

Abstract

Keywords

ASJC Scopus subject areas

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