Induced Fubini-Study metrics on strictly pseudoconvex CR manifolds and zeros of random CR functions

Abstract

Let X be a compact strictly pseudoconvex embeddable Cauchy-Riemann manifold and let TP be the Toeplitz operator on X associated with a first-order pseudodifferential operator P. In our previous work we established the asymptotic expansion for k large of the kernel of the operators (k-1TP), where is a smooth cut-off function supported in the positive real line. By using these asymptotics, we show in this paper that X can be projectively embedded by maps with components of the form (k-1λ)fλ, where λ is an eigenvalue of TP and fλ is a corresponding eigenfunction. We establish the asymptotics of the pull-back of the Fubini-Study metric by these maps and we obtain the distribution of the zero divisors of random Cauchy-Riemann functions. We then establish a version of the Lelong-Poincar\'e formula for domains with boundary and obtain the distribution of the zero divisors of random holomorphic functions on strictly pseudoconvex domains.