On the Diophantine equations x²-xy-y²+lx=0 and x²-3xy+y²+lx=0

Yaowaluk Alibaud, Supawadee Prugsapitak^*, Wuttichon Aukkhosuwan

ABSTRACT: This study determines all positive integer solutions of the Diophantine equations of the form x² − x y − y² ± l x = 0 and x² − 3x y + y² ± l x = 0, where l is of the form m∏ⁿ _i=1 p_i^ai , p_i is a prime congruent to 2 or 3 modulo 5, and m is either 1 or 5. In addition, we also provide all positive integer solutions of x2 − x y − y² ± l y = 0.

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^a	Algebra and Applications Research Unit, Department of Mathematics and Statistics, Faculty of Science, Prince of Songkla University, Songkhla 90110 Thailand

* Corresponding author, E-mail: supawadee.p@psu.ac.th

Received 18 Apr 2020, Accepted 16 Jun 2020

On the Diophantine equations x2-xy-y2+lx=0 and x2-3xy+y2+lx=0

Yaowaluk Alibaud, Supawadee Prugsapitak*, Wuttichon Aukkhosuwan

On the Diophantine equations x²-xy-y²+lx=0 and x²-3xy+y²+lx=0

Yaowaluk Alibaud, Supawadee Prugsapitak^*, Wuttichon Aukkhosuwan