On multivariate Newton-like inequalities

Abstract

We study multivariate entire functions and polynomials with non-negative coefficients. A class of Strongly Log-Concave entire functions, generalizing Minkowski volume polynomials, is introduced: an entire function f in m variables is called Strongly Log-Concave if the function (∂ x1)c1...(∂ xm)cm f is either zero or ((∂ x1)c1...(∂ xm)cm f) is concave on R+m. We start with yet another point of view (via propagation) on the standard univarite (or homogeneous bivariate) Newton Inequlities. We prove analogues of (univariate) Newton Inequlities in the (multivariate) Strongly Log-Concave case. One of the corollaries of our new Newton(like) inequalities is the fact that the support supp(f) of a Strongly Log-Concave entire function f is discretely convex (D-convex in our notation). The proofs are based on a natural convex relaxation of the derivatives Derf(r1,...,rm) of f at zero and on the lower bounds on Derf(r1,...,rm), which generalize the Van Der Waerden-Falikman-Egorychev inequality for the permanent of doubly-stochastic matrices. A few open questions are posed in the final section.