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