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- Skoda–El_Mir_theorem abstract "The Skoda–El Mir theorem is a theorem of complex geometry, stated as follows:Theorem (Skoda, El Mir, Sibony ). Let X be a complex manifold, and E a closed complete pluripolar set in X. Consider a closed positive current on which is locally integrable around E. Then the trivial extension of to X is closed on X.".
- Skoda–El_Mir_theorem wikiPageID "10477988".
- Skoda–El_Mir_theorem wikiPageRevisionID "551311150".
- Skoda–El_Mir_theorem subject Category:Complex_manifolds.
- Skoda–El_Mir_theorem subject Category:Several_complex_variables.
- Skoda–El_Mir_theorem subject Category:Theorems_in_geometry.
- Skoda–El_Mir_theorem comment "The Skoda–El Mir theorem is a theorem of complex geometry, stated as follows:Theorem (Skoda, El Mir, Sibony ). Let X be a complex manifold, and E a closed complete pluripolar set in X. Consider a closed positive current on which is locally integrable around E. Then the trivial extension of to X is closed on X.".
- Skoda–El_Mir_theorem label "Skoda–El Mir theorem".
- Skoda–El_Mir_theorem sameAs Skoda%E2%80%93El_Mir_theorem.
- Skoda–El_Mir_theorem sameAs Q7536097.
- Skoda–El_Mir_theorem sameAs Q7536097.
- Skoda–El_Mir_theorem wasDerivedFrom Skoda–El_Mir_theorem?oldid=551311150.