Diophantine equations with three monomials
From MaRDI portal
Publication:6046937
DOI10.1016/j.jnt.2023.06.011arXiv2307.02513MaRDI QIDQ6046937
Ashleigh Wilcox, Bogdan Grechuk, Tetiana Grechuk
Publication date: 6 September 2023
Published in: Journal of Number Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2307.02513
integer solutionsDiophantine equationsgeneralized Fermat equationsthree-monomial equationstwo-variable equations
Computer solution of Diophantine equations (11Y50) Number-theoretic algorithms; complexity (11Y16) Higher degree equations; Fermat's equation (11D41)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Quadratic Diophantine equations. With a foreword by Preda Mihăilescu
- Polynomial parametrization for the solutions of Diophantine equations and arithmetic groups
- On the practical solution of the Thue equation
- The decision problem for exponential diophantine equations
- Solving genus zero Diophantine equations with at most two infinite valuations
- Modular elliptic curves and Fermat's Last Theorem
- The Diophantine equation \(Ax^ p+By^ q=Cz^ r\).
- The Generalized Fermat Equation
- How to solve a quadratic equation in integers
- A quantitative version of Runge's theorem on diophantine equations
- On the equation $y^m = P(x)$
- Points entiers sur les courbes de genre 0
- Reciprocal Arrays and Diophantine Analysis
- On the integer solutions of quadratic equations
- Primary cyclotomic units and a proof of Catalans conjecture
- On the Equations zm = F (x, y ) and Axp + Byq = Czr
- The generalized Fermat equation with exponents 2, 3,
- An Introduction to Diophantine Equations
- Absolute irreducibility of polynomials via Newton polytopes
- Alan Baker, FRS, 1939–2018
