On a variation of the Erdős–Selfridge superelliptic curve
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Publication:5237344
DOI10.1112/blms.12254zbMath1453.11050OpenAlexW3104323829MaRDI QIDQ5237344
Publication date: 17 October 2019
Published in: Bulletin of the London Mathematical Society (Search for Journal in Brave)
Full work available at URL: http://eprints.whiterose.ac.uk/145756/8/Edis-2019-Bulletin_of_the_London_Mathematical_Society.pdf
Galois representations (11F80) Exponential Diophantine equations (11D61) Higher degree equations; Fermat's equation (11D41)
Related Items (4)
Powers from products of terms in progressions with gaps ⋮ Rational solutions to the variants of Erdős–Selfridge superelliptic curves ⋮ Constraint programming approaches to disassembly line balancing problem with sequencing decisions ⋮ More variants of Erdős-Selfridge superelliptic curves and their rational points
Cites Work
- The product of consecutive integers is never a power
- Explicit estimates of some functions over primes
- VARIANTS OF ERDŐS–SELFRIDGE SUPERELLIPTIC CURVES AND THEIR RATIONAL POINTS
- Sharper Bounds for the Chebyshev Functions θ(x) and ψ(x). II
- Rational Points on a Class of Superelliptic Curves
- Rational points on Erdős–Selfridge superelliptic curves
- On the interval containing at least one prime number
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