References
- Bedford , E and Taylor , BA . 1976 . The Dirichlet problem for the complex Monge–Ampére operator . Invent. Math. , 37 : 1 – 44 .
- Bedford , E and Taylor , BA . 1982 . A new capacity for plurisubharmonic functions . Acta Math , 149 : 1 – 40 .
- Cegrell , U . 1998 . Pluricomplex energy . Acta Math. , 180 : 187 – 217 .
- Cegrell , U . 2004 . The general definition of the complex Monge-Ampére operator . Ann. Inst. Fourier , 54 : 159 – 179 .
- Åhag , P and Czyz , R . 2007 . On the Cegrell classes . Math. Zeit. , 256 : 243 – 264 .
- Cegrell , U and Zeriahi , A . 2003 . Subextension of plurisubharmonic functions with bounded Monge-Ampére operator mass . C. R. Acad. Sci. Paris , 336 : 305 – 308 .
- Cegrell , U , Kołodziej , S and Zeriahi , A . 2005 . Subextension of plurisubharmonic functions with weak singularities . Math. Zeit. , 250 : 7 – 22 .
- Wiklund , J . 2006 . On subextension of pluriharmonic and plurisubharmonic functions . Ark. Mat. , 44 : 182 – 190 .
- Klimek , M . 1991 . Pluripotential Theory , New York : Oxford University Press .
- Cegrell , U and Wiklund , J . 2005 . A Monge-Ampére norm for delta-plurisubharmonic functions . Math. Scand. , 97 : 201 – 216 .
- Kołodziej , S . 1995 . The range of the complex Monge-Ampére operator . II, Indiana Univ. Math. J , 44 : 765 – 782 .
- Åhag , P , Czyz , R and Hiep , P . 2007 . Concerning the energy class ℰ p for 0 < p < 1 . Ann. Polon. Math , 91 : 119 – 130 .
- Bedford , E and Taylor , BA . 1987 . Fine topology, Silov boundary, and (dd c ) n . J. Funct. Anal. , 72 : 225 – 251 .
- Hörmander , L . 1994 . “ Notion of Convexity ” . In Progess in Mathematics , Vol. 127 , Boston : Birkhäuser .
- P , Åhag . Monge-Ampére measures on pluripolar sets Available at http://www.arxiv.org, preprint (2007)