The integer solutions of the cubic Diophantine equation x3±33=pqy2

Heng LI; Hai YANG; Yongliang LUO

doi:10.13338/j.issn.1674-649x.2021.01.018

Xi'an Gongcheng Daxue xuebao (Feb 2021)

The integer solutions of the cubic Diophantine equation x3±33=pqy2

Heng LI,
Hai YANG,
Yongliang LUO

Affiliations

Heng LI: School of Science, Xi’an Polytechnic University, Xi’an 710048, China
Hai YANG: School of Science, Xi’an Polytechnic University, Xi’an 710048, China
Yongliang LUO: School of Science, Xi’an Polytechnic University, Xi’an 710048, China

DOI: https://doi.org/10.13338/j.issn.1674-649x.2021.01.018
Journal volume & issue: Vol. 35, no. 1
pp. 114 – 117

Abstract

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The solvability of a class of cubic Diophantine equations is studied by using properties of congruence, Legendre symbol and the methods of elementary number theory. The following several results are obtained: If p=3(24r+19)(24r+20)+1(r∈Z+) is odd prime, Diophantine equation x3±33=pqy2 has no positive integer solution；If both p≡13(mod24)and q=12s2+1(s∈Z+, 2 s) are odd primes, Legendre (p/q)=-1, Diophantine equation x3-33=pqy2 has only trivial solution (x, y)=(3, 0).

Published in Xi'an Gongcheng Daxue xuebao

ISSN: 1674-649X (Print)
Publisher: Editorial Office of Journal of XPU
Country of publisher: China
LCC subjects: Technology: Electrical engineering. Electronics. Nuclear engineering: Materials of engineering and construction. Mechanics of materials; Technology: Engineering (General). Civil engineering (General): Environmental engineering
Website: http://journal.xpu.edu.cn/

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