Polynomial maps with invertible sums of Jacobian matrices and of directional Derivatives

Abstract

Let F: Cn → Cm be a polynomial map with degF=d ≥ 2. We prove that F is invertible if m = n and Σd-1i=1 JF(αi) is invertible for all i, which is trivially the case for invertible quadratic maps. More generally, we prove that for affine lines L = \β + μ γ | μ ∈ C\ ⊂eq Cn (γ 0), F|L is linearly rectifiable, if and only if Σd-1i=1 JF(αi) · γ 0 for all αi ∈ L. This appears to be the case for all affine lines L when F is injective and d 3. We also prove that if m = n and Σni=1 JF(αi) is invertible for all αi ∈ Cn, then F is a composition of an invertible linear map and an invertible polynomial map X+H with linear part X, such that the subspace generated by \JH(α) | α ∈ Cn\ consists of nilpotent matrices.