A note on irreducible slice algebraic sets
Abstract
In this short note we prove that if I is a right radical and quasi prime ideal in the ring of quaternionic slice regular polynomials, then the symmetrization SVc(I) is an irreducible algebraic set, where Vc(I) is the set of common zeros with commuting components of polynomials in I. Combining this fact with the results proved in our previous paper [3], we obtain that for I radical, Vc(I) is irreducible if and only if I is quasi prime.
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