Integral points on the elliptic curve \(E_{ pq }\): \(y^2 = x^3 + ( pq - 12) x - 2( pq - 8)\)
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Publication:2283202
DOI10.1007/s13226-019-0329-4zbMath1455.11082OpenAlexW2946721103MaRDI QIDQ2283202
Hourong Qin, Qingzhong Ji, Teng Cheng
Publication date: 30 December 2019
Published in: Indian Journal of Pure \& Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s13226-019-0329-4
Rational points (14G05) Elliptic curves over global fields (11G05) Fibonacci and Lucas numbers and polynomials and generalizations (11B39)
Cites Work
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- An algorithm to determine the points with integral coordinates in certain elliptic curves
- On squares in certain Lucas sequences
- Integral points on the elliptic curve \(y^2=x^3+27x-62\)
- The integral points on elliptic curves y 2 = x 3 + (36n 2 − 9)x − 2(36n 2 − 5)
- An elliptic curve having large integral points
- Generalized Fibonacci and Lucas Sequences and Rootfinding Methods
- Large Integral Points on Elliptic Curves
- Computing all integer solutions of a genus 1 equation
- On the Elliptic Logarithm Method for Elliptic Diophantine Equations: Reflections and an Improvement
- The Diophantine Equation y 2 = ax 3 +bx 2 +cx +d
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