On the one dimensional polynomial, regular and regulous images of closed balls and spheres

Abstract

We present a full geometric characterization of the 1-dimensional (semialgebraic) images S of either n-dimensional closed balls Bn⊂ Rn or n-dimensional spheres Sn⊂ Rn+1 under polynomial, regular and regulous maps for some n≥1. In all the previous cases one can find an alternative polynomial, regular or regulous map on either B1:=[-1,1] or S1 such that S is the image under such map of either B1:=[-1,1] or S1. As a byproduct, we provide a full characterization of the images of S1⊂ C R2 under Laurent polynomials f∈ C[ z, z-1], taking advantage of some previous works of Kobalev-Yang and Wilmshurst. We also alternatively prove that all polynomial maps Sk S1 are constant if k≥2.