Fermat cubic

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In geometry, the Fermat cubic, named after Pierre de Fermat, is a surface defined by

$x^{3}+y^{3}+z^{3}=1.\$

Methods of algebraic geometry provide the following parametrization of Fermat's cubic:

$x(s,t)={3t-{1 \over 3}(s^{2}+st+t^{2})^{2} \over t(s^{2}+st+t^{2})-3}$

$y(s,t)={3s+3t+{1 \over 3}(s^{2}+st+t^{2})^{2} \over t(s^{2}+st+t^{2})-3}$

$z(s,t)={-3-(s^{2}+st+t^{2})(s+t) \over t(s^{2}+st+t^{2})-3}.$

In projective space the Fermat cubic is given by

$w^{3}+x^{3}+y^{3}+z^{3}=0.$

The 27 lines lying on the Fermat cubic are easy to describe explicitly: they are the 9 lines of the form (w : aw : y : by) where a and b are fixed numbers with cube −1, and their 18 conjugates under permutations of coordinates.

Real points of Fermat cubic surface.

References

Ness, Linda (1978), "Curvature on the Fermat cubic", Duke Mathematical Journal 45 (4): 797–807, ISSN 0012-7094, MR 518106
Elkies, Noam. "Complete cubic parametrization of the Fermat cubic surface".

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