Regularity of the Bergman projection in certain nonpseudoconvex domains

A study of the Bergman projection in certain Hartogs domains

We show that the Bergman projection does not preserve smoothness of functions in some pseudoconvex domains in the space of two complex variables.

The Bergman Projection on Sectorial Domains

Regularity of the Bergman Projection on Forms and Plurisubharmonicity Conditions

A function f ∈ C(Ω) is holomorphic on Ω, if it satisfies the CauchyRiemann equations: ∂̄f = ∑n k=1 ∂f ∂z̄k dz̄k = 0 in Ω. Denote the set of holomorphic functions on Ω by H(Ω). The Bergman projection, B0, is the orthogonal projection of square-integrable functions onto H(Ω)∩L2(Ω). Since the Cauchy-Riemann operator, ∂̄ above, extends naturally to act on higher order forms, we can as well define Bergm...

Irregularity of the Bergman Projection on Worm Domains in C

We construct higher-dimensional versions of the Diederich-Fornæss worm domains and show that the Bergman projection operators for these domains are not bounded on high-order Lp-Sobolev spaces for 1 ≤ p < ∞.

Analytic Functionals and the Bergman Projection on Circular Domains

A property of the Bergman projection associated to a bounded circular domain containing the origin in C^ is proved: Functions which extend to be holomorphic in large neighborhoods of the origin are characterized as Bergman projections of smooth functions with small support near the origin. For certain circular domains D, it is also shown that functions which extend holomorphically to a neighbor...