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- Siu's_semicontinuity_theorem abstract "In complex analysis, the Siu semicontinuity theorem implies that the Lelong number of a closed positive current on a complex manifold is semicontinuous. More precisely, the points where the Lelong number is at least some constant form a complex subvariety. This was conjectured by Harvey & King (1972) and proved by Siu (1973, 1974). Demailly (1987) generalized Siu's theorem to more general versions of the Lelong number.".
- Siu's_semicontinuity_theorem wikiPageExternalLink BF02392558.
- Siu's_semicontinuity_theorem wikiPageID "37715199".
- Siu's_semicontinuity_theorem wikiPageRevisionID "524986207".
- Siu's_semicontinuity_theorem authorlink "Yum Tong Siu".
- Siu's_semicontinuity_theorem hasPhotoCollection Siu's_semicontinuity_theorem.
- Siu's_semicontinuity_theorem last "Siu".
- Siu's_semicontinuity_theorem year "1973".
- Siu's_semicontinuity_theorem year "1974".
- Siu's_semicontinuity_theorem subject Category:Complex_manifolds.
- Siu's_semicontinuity_theorem subject Category:Theorems_in_complex_analysis.
- Siu's_semicontinuity_theorem comment "In complex analysis, the Siu semicontinuity theorem implies that the Lelong number of a closed positive current on a complex manifold is semicontinuous. More precisely, the points where the Lelong number is at least some constant form a complex subvariety. This was conjectured by Harvey & King (1972) and proved by Siu (1973, 1974). Demailly (1987) generalized Siu's theorem to more general versions of the Lelong number.".
- Siu's_semicontinuity_theorem label "Siu's semicontinuity theorem".
- Siu's_semicontinuity_theorem sameAs m.0nfw5g4.
- Siu's_semicontinuity_theorem sameAs Q7532192.
- Siu's_semicontinuity_theorem sameAs Q7532192.
- Siu's_semicontinuity_theorem wasDerivedFrom Siu's_semicontinuity_theorem?oldid=524986207.
- Siu's_semicontinuity_theorem isPrimaryTopicOf Siu's_semicontinuity_theorem.