Szasz Analytic Functions and Noncompact K\"ahler Toric Manifolds

Abstract

We show that the classical Szasz analytic function SN(f)(x) is obtained by applying the pseudo-differential operator f(N-1Dθ) to the Bergman kernels for the Bargmann-Fock space. The expression generalizes immediately to any smooth polarized noncompact complete toric manifold, defining the generalized Szasz analytic function ShN(f)(x). About ShN(f)(x), we prove that it admits complete asymptotics and there exists a universal scaling limit. % We also consider some dilation operator composed with ShN(f)(x) and we give an estimate about this composition. As an example, we will further compute ShN(f)(x) for the Bergman metric on the unit ball.