Concentration for the zero set of large random polynomial systems

Abstract

For random systems of K polynomials in N + 1 real variables which include the models of Kostlan (1987) and Shub and Smale (1993), we prove that the number of zeros on the unit sphere for K = N or the Hausdorff measure of the zero set for K < N concentrates around its mean as N∞. To prove concentration we show that the variance of the latter random variable normalized by its mean goes to zero. The polynomial systems we consider depend on a set of parameters which determine the variance of their Gaussian coefficients. We prove that the convergence is uniform in those parameters and K.