Quasibounded solutions to the complex Monge-Ampère equation

Abstract: We study the Dirichlet problem for the complex Monge-Amp`ere operator on a B-regular domain $\Omega$, allowing boundary data that is singular or unbounded. We introduce the concept of pluri-quasibounded functions on $\Omega$ and $\partial \Omega$, defined by the existence of plurisuperharmonic majorants that dominate their absolute value in a strong sense - that is, the ratio of the function to the majorant tends to zero as the function tends to infinity. For such data, we prove existence and uniqueness of solutions in the Blocki--Cegrell class $\mathcal{D}(\Omega)$, using a recently established comparison principle. In the unit disk, our approach recovers harmonic functions represented as Poisson integrals of $L^1$ boundary data with respect to harmonic measure, and our characterization extends to all regular domains in $\mathbb{R}^n$, when the boundary data is continuous almost everywhere. We also describe how boundary singularities propagate into the interior via a refined pluripolar hull.