Local \(T\)-pluripolarity and \(T\)-pluripolarity of a subset and some Cegrell's pluricomplex energy classes associated to a positive closed current (Q1030965)

Let \(T\) be a closed positive current of dimension \(\geq1\) in a domain \(\varOmega\subset\mathbb C^n\). The authors prove that the local \(T\)-pluripolarity of a set \(E\subset\varOmega\) is equivalent to its global \(T\)-pluripolarity. Moreover, the authors define extended Cegrell classes \(\mathcal E^T_0(\varOmega)\), \(\mathcal E^T(\varOmega)\), \(\mathcal F^T(\varOmega)\) and study their various properties.