Topology of zero sets of polynomials with square discriminant

Abstract

Let N ≠ \0\ be a fixed set of integers, closed under multiplication, closed under negation, or containing \ 1\. We prove that any zero of a polynomial in Z[X] whose coefficients lie in N can be approximated in C to arbitrary precision by a zero of a polynomial in Z[X] with square discriminant whose coefficients also lie in N. Hence the topology of the closure in C of the set of zeros of all such polynomials is insensitive to the discriminant being a square, in contrast to the Galois groups of the polynomials.

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