Symmetries of various sets of polynomials

Abstract

Let K be a field of characteristic 0, and let k ≥ 2 be an integer. We prove that every K-linear bijection f K[X] K[X] strongly preserving the set of k-free polynomials (or the set of polynomials with a k-fold root in K) is a constant multiple of a K-algebra automorphism of K[X], i.e., that there are elements a, c ∈ K× and b ∈ K such that f(P)(X) = c P(a X + b). When K is a number field or K= R, we prove that similar statements hold when f preserves the set of polynomials with a root in K.

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