[ [ [ 0, 0 ], [ 0, 91 ], [ 560, 182 ], [ 588, 182 ], [ 560, 273 ], [ 672, 182 ], [ 588, 273 ], [ 672, 273 ] ] ]
# Each entry specifies a pair of exponents to the primitive root $\omega$ of $\F_{3^6}$,
# which is represented as $\F_3[x]/{\langle x^6 - x^4 + x^2 - x - 1\rangle}$. The specific
# element of the Segre variety can be obtained by applying the multiplication map to the
# resulting elements. That is, the map $(a, b) \mapsto \omega^a \omega^b$ yields the correct
# element of the Segre variety in the model $\F_{3^6}^\times$ over $\F_{3}^\times$.