Hilbert's 10th Problem via Mordell curves

Abstract

We show that for 5/6-th of all primes p, Hilbert's 10-th Problem is unsolvable for Q(ζ3, [3]p). We also show that there is an infinite set S of square free integers such tha Hilbert's 10-th Problem is unsolvable over the number fields Q(ζ3, D, [3]p) for every D ∈ S and every prime p 2,5 9. We use the CM elliptic curves Y2=X3-432D2 associated to the cube sum problem, with D varying in suitable congruence class, in our proof.

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