The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
We describe compact subsets K of ∂𝔻 and ℝ admitting holomorphic functions f with the domains of existence equal to ℂ∖K and such that the pluripolar hulls of their graphs are infinitely sheeted. The paper is motivated by a recent paper of Poletsky and Wiegerinck.
Let F be the Cartesian product of N closed sets in ℂ. We prove that there exists a function g which is continuous on F and holomorphic on the interior of F such that is complete pluripolar in . Using this result, we show that if D is an analytic polyhedron then there exists a bounded holomorphic function g such that is complete pluripolar in . These results are high-dimensional analogs of the previous ones due to Edlund [Complete pluripolar curves and graphs, Ann. Polon. Math. 84 (2004), 75-86]...
Let be a closed polar subset of a domain in . We give a complete
description of the pluripolar hull of the graph of a
holomorphic function defined on . To achieve this, we prove for
pluriharmonic measure certain semi-continuity properties and a localization principle.
We prove, among other results, that is plurisubharmonic (psh) when belong to a family of functions in where is the -Lipchitz functional space with Then we establish a new characterization of holomorphic functions defined on open sets of
It is proved that any subharmonic function in a domain Ω ⊂ ℂⁿ which is plurisubharmonic outside of a real hypersurface of class C¹ is indeed plurisubharmonic in Ω.
Currently displaying 1 –
5 of
5