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$\boldsymbol{x}^{\boldsymbol{4}} \boldsymbol{+} \boldsymbol{2}^{\boldsymbol{n}}\boldsymbol{y}^{\boldsymbol{4}} \boldsymbol{=} \boldsymbol{1}$ IN QUADRATIC NUMBER FIELDSPublished online by Cambridge University Press: 06 November 2020
Aigner showed in 1934 that nontrivial quadratic solutions to
$x^4 + y^4 = 1$
exist only in
$\mathbb Q(\sqrt {-7})$
. Following a method of Mordell, we show that nontrivial quadratic solutions to
$x^4 + 2^ny^4 = 1$
arise from integer solutions to the equations
$X^4 \pm 2^nY^4 = Z^2$
investigated in 1853 by V. A. Lebesgue.
${x}^4+{y}^4={z}^4$
in quadratischen körpern’, Jahresber. Dtsch. Math.-Ver. 43 (1934), 226–229.Google Scholar
${x}^4+{y}^4=1$
’, Soviet Math. Dokl. 1 (1960), 1149–1151.Google Scholar
${z}^2={x}^4\pm {2}^m{y}^4$
, (3)
${z}^2={2}^m{x}^4-{y}^4$
, (4), (5)
${2}^m{z}^2={x}^4\pm {y}^4$
’, J. Math. Pures Appl. 18 (1853), 73–86. https://archive.org/details/s1journaldemat18liou/page/72/mode/2up.Google Scholar
${x}^4+p{y}^4={z}^4$
’, Rocky Mountain J. Math. 36(3) (2006), 1027–1031.Google Scholar
${x}^4+{y}^4=1$
in algebraic number fields’, Acta Arith. 14 (1967/68), 347–355.CrossRefGoogle Scholar
