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arxiv: 2402.01378 · v1 · pith:UM7HXP75 · submitted 2024-02-02 · math.RA · math.AG

On the geometry of zero sets of central quaternionic polynomials

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classification math.RA math.AG
keywords centralcommonpolynomialsquaternionicvanisheszerosalgebracase
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Let R be the ring of polynomials in n central variables over the real quaternion algebra H, and let I be a left ideal in R. We prove that if a polynomial p in R vanishes at all the common zeros of I in H^n with commuting coordinates, then as a slice regular quaternionic function, p vanishes at all common zeros of I in H^n. This confirms a conjecture of Gori, Sarfatti and Vlacci, who settled the two dimensional case.

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