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I’ve planned 300 hours for the details of Wiles’ Proof of Fermat’s Last Theorem.
Update:
after fig.8.3. Galois’ imaginary number ⊥ 0s,
Below, when α ⊂ Galois’ imaginary number, e.g. (3) means the distance (0 + 0 = 0) with (p - 1 + 1 = p = 0) is in distance 0, then Galois’s imaginary number = null.
after fig.8.5. Fp | p ∋ n, n = {0, 1, 2, … , p-1},
When (Galois’s imaginary number α) ⊃ (all n\0), F3 = F5 = F7 in fig.8.5.
after fig.8.6. compare {x2, x1}f^l_set with {1, 2, 3, 4, 5, 6}F7_set, {1}Fp_set, {0}Fp_set,
And reading the Wiles’ proof different, below as α = Galois’ imaginary number, as imaginary number field is materializing spar-time’s objects.
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