Universality and scaling of zeros on symplectic manifolds
Abstract
This article is concerned with random holomorphic polynomials and their generalizations to algebraic and symplectic geometry. A natural algebro-geometric generalization studied in our prior work involves random holomorphic sections H0(M,LN) of the powers of any positive line bundle L M over any complex manifold. Our main interest is in the statistics of zeros of k independent sections (generalized polynomials) of degree N as N∞. We fix a point P and focus on the ball of radius 1/N about P. Under a microscope magnifying the ball by the factor N, the statistics of the configurations of simultaneous zeros of random k-tuples of sections tends to a universal limit independent of P,M,L. We review this result and generalize it further to the case of pre-quantum line bundles over almost-complex symplectic manifolds (M,J,ω). Following [SZ2], we replace H0(M,LN) in the complex case with the `asymptotically holomorphic' sections defined by Boutet de Monvel-Guillemin and (from another point of view) by Donaldson and Auroux. Using a generalization to an m-dimensional setting of the Kac-Rice formula for zero correlations together with the results of [SZ2], we prove that the scaling limits of the correlation functions for zeros of random k-tuples of asymptotically holomorphic sections belong to the same universality class as in the complex case.
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