Pluripolar sets and the subextension in Cegrell's classes
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Publication:3518531
DOI10.1080/17476930801966893zbMath1169.32011OpenAlexW2165863194MaRDI QIDQ3518531
Publication date: 8 August 2008
Published in: Complex Variables and Elliptic Equations (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/17476930801966893
Related Items (16)
Subextension of plurisubharmonic functions with boundary values in weighted pluricomplex energy classes ⋮ Weighted pluricomplex energy ⋮ Monge–Ampère measures of $\mathcal F$-plurisubharmonic functions ⋮ Subextension of \(m\)-subharmonic functions ⋮ Some weighted energy classes of plurisubharmonic functions ⋮ A note on maximal subextensions of plurisubharmonic functions ⋮ Local property of the class \(\mathcal E_{\chi}, loc\) ⋮ Maximal subextensions of plurisubharmonic functions ⋮ Monge-Ampère measures on subvarieties ⋮ Local property of maximal unbounded plurifinely plurisubharmonic functions ⋮ Weak solutions to the complex \(m\)-Hessian equation on open subsets of \(\mathbb{C}^n\) ⋮ Subextension and approximation of negative plurisubharmonic functions ⋮ Monge–Ampère measures of maximal subextensions of plurisubharmonic functions with given boundary values ⋮ Weak solutions to the complex Monge-Ampère equation on open subsets of \(\mathbb{C}^n\) ⋮ The Monge–Ampère type equation in the weighted pluricomplex energy class ⋮ Subextension of plurisubharmonic functions without changing the Monge–Ampère measures and applications
Cites Work
- On subextension of pluriharmonic and plurisubharmonic functions
- Fine topology, Šilov boundary, and \((dd^ c)^ n\)
- The Dirichlet problem for a complex Monge-Ampère equation
- Pluricomplex energy
- Subextension of plurisubharmonic functions with bounded Monge--Ampère mass
- Subextension of plurisubharmonic functions with weak singularities
- On the Cegrell classes
- Concerning the energy class Epfor 0<p<1
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