On Fermat's equation over some quadratic imaginary number fields
Abstract
Assuming a deep but standard conjecture in the Langlands programme, we prove Fermat's Last Theorem over Q(i). Under the same assumption, we also prove that, for all prime exponents p ≥ 5, Fermat's equation ap+bp+cp=0 does not have non-trivial solutions over Q(-2) and Q(-7).
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