Pointwise estimates of the Bergman kernel with an exponential weight on the unit ball

Abstract

We consider the weighted Bergman space A2() of all holomorphic functions on square integrable with respect to a particular exponential weight measure e- dV on , where align* (z):=11-|z|2. align* We prove the following estimate for the Bergman kernel K(z,w) of A2(): align* |K(z,w)|2 Ce(z)+(w) Vol(B(z,1)) Vol(B(w, 1))e- d(z,w), z, w∈, align* where d is the Riemannian distance induced by the potential function and B(z,1) is the d-ball of center z and radius 1. The result is motivated by Christ Chr.

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