Two Results on Homogeneous Hessian Nilpotent Polynomials

Abstract

Let z=(z1, ..., zn) and =Σi=1n ∂2∂ z2i the Laplace operator. A formal power series P(z) is said to be Hessian Nilpotent(HN) if its Hessian matrix P(z)=( ∂2 P∂ zi∂ zj) is nilpotent. In recent developments in [BE1], [M] and [Z], the Jacobian conjecture has been reduced to the following so-called vanishing conjecture(VC) of HN polynomials: for any homogeneous HN polynomial P(z) (of degree d=4), we have m Pm+1(z)=0 for any m>>0. In this paper, we first show that, the VC holds for any homogeneous HN polynomial P(z) provided that the projective subvarieties ZP and Zσ2 of C Pn-1 determined by the principal ideals generated by P(z) and σ2(z):=Σi=1n zi2, respectively, intersect only at regular points of ZP. Consequently, the Jacobian conjecture holds for the symmetric polynomial maps F=z-∇ P with P(z) HN if F has no non-zero fixed point w∈ Cn with Σi=1n wi2=0. Secondly, we show that the VC holds for a HN formal power series P(z) if and only if, for any polynomial f(z), m (f(z)P(z)m)=0 when m>>0.