Random polynomials with prescribed Newton polytope, I
Abstract
The Newton polytope of a polynomial is well known to have a strong impact on its zeros, as in the Kouchnirenko-Bernstein theorem on the number of simultaneous zeros of polynomials with given Newton polytopes. In this article, we show that also has a strong impact on the distribution of zeros of one or several polynomials. We equip the space of (holomorphic) polynomials of degree in complex variables with its usual -invariant Gaussian measure and then consider the conditional measures induced on the subspace of polynomials whose Newton polytope . When , the unit simplex, then it is obvious and well-known that the expected distribution of zeros (regarded as a current) of polynomials of degree is uniform relative to the Fubini-Study form. Our main results concern the conditional expectation of zeros of polynomials with Newton polytope (where ); these results are asymptotic as the scaling factor . We show that is asymptotically uniform on the inverse image of the open scaled polytope via the moment map for projective space. However, the zeros have an exotic distribution outside of and when (the case of the Kouchnirenko-Bernstein theorem) the percentage of zeros outside approaches 0 as .
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