English

Random polynomials with prescribed Newton polytope, I

Algebraic Geometry 2007-05-23 v2 Complex Variables Probability

Abstract

The Newton polytope PfP_f of a polynomial ff is well known to have a strong impact on its zeros, as in the Kouchnirenko-Bernstein theorem on the number of simultaneous zeros of mm polynomials with given Newton polytopes. In this article, we show that PfP_f also has a strong impact on the distribution of zeros of one or several polynomials. We equip the space of (holomorphic) polynomials of degree N\leq N in mm complex variables with its usual SU(m+1)SU(m+1)-invariant Gaussian measure and then consider the conditional measures γNP\gamma_{|NP} induced on the subspace of polynomials whose Newton polytope PfNPP_f\subset NP. When P=ΣP=\Sigma, the unit simplex, then it is obvious and well-known that the expected distribution of zeros Zf1,...,fkZ_{f_1,...,f_k} (regarded as a current) of kk polynomials f1,...,fkf_1,...,f_k of degree NN is uniform relative to the Fubini-Study form. Our main results concern the conditional expectation ENP(Zf1,...,fk)E_{|NP} (Z_{f_1,...,f_k}) of zeros of kk polynomials with Newton polytope NPNpΣNP\subset Np\Sigma (where p=degPp=\deg P); these results are asymptotic as the scaling factor NN\to\infty. We show that ENP(Zf1,...,fk)E_{|NP} (Z_{f_1,...,f_k}) is asymptotically uniform on the inverse image APA_P of the open scaled polytope p1Pp^{-1}P^\circ via the moment map μ:CPmΣ\mu:CP^m\to\Sigma for projective space. However, the zeros have an exotic distribution outside of APA_P and when k=mk=m (the case of the Kouchnirenko-Bernstein theorem) the percentage of zeros outside APA_P approaches 0 as NN\to\infty.

Keywords

Cite

@article{arxiv.math/0203074,
  title  = {Random polynomials with prescribed Newton polytope, I},
  author = {Bernard Shiffman and Steve Zelditch},
  journal= {arXiv preprint arXiv:math/0203074},
  year   = {2007}
}

Comments

Changes to introduction and other minor changes; 56 pages, 7 figures