On the size of sets in which \(xy + 4\) is always a square
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Publication:2270581
DOI10.1216/RMJ-2009-39-4-1195zbMath1230.11037MaRDI QIDQ2270581
Publication date: 28 July 2009
Published in: Rocky Mountain Journal of Mathematics (Search for Journal in Brave)
Quadratic and bilinear Diophantine equations (11D09) Counting solutions of Diophantine equations (11D45) Approximation to algebraic numbers (11J68)
Related Items (11)
Extension of a Diophantine triple with the property \(D(4)\) ⋮ The problem of the extension of D(4)-triple {1, b, c} ⋮ On the \(D(4)\)-pairs \(\{a, ka\}\) with \(k\in \{2,3,6\}\) ⋮ \(D(4)\)-triples with two largest elements in common ⋮ AN UPPER BOUND FOR THE NUMBER OF DIOPHANTINE QUINTUPLES ⋮ There does not exist a \(D(4)\)-sextuple ⋮ There are only finitely many \(D(4)\)-quintuples ⋮ Two-parameter families of uniquely extendable Diophantine triples ⋮ Nonexistence of \(D(4)\)-quintuples ⋮ On the family of Diophantine triples \(\{k+1,4k,9k+3\}\) ⋮ On a family of Diophantine triples \(\{k,A^2k+2A,(A+1)^2k+2(A+1)\}\) with two parameters
Cites Work
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