Estimates on the Bergman Kernels of Convex Domains

## Abstract Let __E__ be a 𝒟ℱ𝒩‐space and let __U ⊂ E__ be open. By applying the nuclearity of the Fréchet space ℋ︁(__U__) of holomorphic functions on __U__ we show that there are finite measures __μ__ on __U__ leading to Bergman spaces of __μ__ ‐square integrable holomorphic functions. We give an e

## Abstract We consider the Bergman projection on Henkin–Leiterer domains, bounded strictly pseudoconvex domains which have defining functions whose gradient is allowed to vanish. Our result describes the mapping properties of the Bergman projection between weighted __L^p^__ spaces, with the weight

The -Neumann operator on (0, q)-forms (1 q n) on a bounded convex domain 0 in C n is compact if and only if the boundary of 0 contains no complex analytic (equivalently: affine) variety of dimension greater than or equal to q.