A note on Newton non-degeneracy of mixed weighted homogeneous polynomials

Abstract

A mixed polynomial f(z, z) is called a mixed weighted homogeneous polynomial (Definition 5) if it is both radially and polar weighted homogeneous. Let f be a mixed weighted homogeneous polynomial with respect to a strictly positive radial weight vector P and a polar weight vector Q. Suppose that f is Newton non-degenerate over a compact face (P) and polar weighted homogeneous of non-zero polar degree with respect to Q. Then f : C*n C has no mixed critical points. Moreover, under the assumption f-1(0) C*n ≠ , f : C*n C is surjective. In other words, in this situation, Newton non-degeneracy over a compact face (P) implies strong Newton non-degeneracy over (P) (Proposition 10). With this fact as a starting point, we investigate the sets f-1(0) C*n, and show the existence of a collection of mixed weighted homogeneous polynomials f = f (P) of non-zero polar degree which satisfy (P) ≥ 1 and f-1(0) C*n = (Theorem 11). We also give an example of convenient mixed function germs of mixed weighted homogeneous face type which are not true non-degenerate (Definition 14).