The Diophantine Equation $x^4 + 2 y^4 = z^4 + 4 w^4$---a number of improvements

Andreas-Stephan Elsenhans; J\"org Jahnel

arxiv: 1006.1196 · v1 · submitted 2010-06-07 · 🧮 math.NT · math.AG

The Diophantine Equation x⁴ + 2 y⁴ = z⁴ + 4 w⁴---a number of improvements

Andreas-Stephan Elsenhans , J\"org Jahnel This is my paper

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The quadruple $(1\,484\,801, 1\,203\,120, 1\,169\,407, 1\,157\,520)$ already known is essentially the only non-trivial solution of the Diophantine equation $x^4 + 2 y^4 = z^4 + 4 w^4$ for $|x|$, $|y|$, $|z|$, and $|w|$ up to one hundred million. We describe the algorithm we used in order to establish this result, thereby explaining a number of improvements to our original approach.

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The Diophantine Equation x⁴ + 2 y⁴ = z⁴ + 4 w⁴---a number of improvements

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