Elliptic boundary value problem: Difference between revisions

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The '''Skoda–El Mir theorem''' is a theorem of [[complex geometry]],
stated as follows:
 
'''Theorem''' (Skoda,<ref>H. Skoda. ''Prolongement des courants positifs fermes de masse finie'', Invent. Math., 66 (1982), 361–376.</ref> El Mir,<ref>H. El Mir. ''Sur le prolongement des courants positifs fermes'', Acta Math., 153 (1984), 1–45.</ref> Sibony <ref>N. Sibony, ''Quelques problemes de prolongement de courants en analyse complexe,'' Duke Math. J., 52 (1985), 157–197</ref>).  Let ''X'' be a [[complex manifold]], and  
''E'' a closed complete [[pluripolar set]] in ''X''. Consider a closed [[positive current]] <math>\Theta</math> on <math> X \backslash E</math>
which is locally integrable around ''E''. Then the trivial extension of <math>\Theta</math> to ''X'' is closed on ''X''.
 
==Notes==
<references />
 
==References==
*J.-P. Demailly,'' [http://arxiv.org/abs/alg-geom/9410022 L² vanishing theorems for positive line bundles and adjunction theory, Lecture Notes of a CIME course on "Transcendental Methods of Algebraic Geometry" (Cetraro, Italy, July 1994)]''
 
{{DEFAULTSORT:Skoda-El Mir theorem}}
[[Category:Complex manifolds]]
[[Category:Several complex variables]]
[[Category:Theorems in geometry]]
 
 
{{differential-geometry-stub}}

Latest revision as of 14:52, 11 December 2013

The Skoda–El Mir theorem is a theorem of complex geometry, stated as follows:

Theorem (Skoda,[1] El Mir,[2] Sibony [3]). Let X be a complex manifold, and E a closed complete pluripolar set in X. Consider a closed positive current Θ on XE which is locally integrable around E. Then the trivial extension of Θ to X is closed on X.

Notes

  1. H. Skoda. Prolongement des courants positifs fermes de masse finie, Invent. Math., 66 (1982), 361–376.
  2. H. El Mir. Sur le prolongement des courants positifs fermes, Acta Math., 153 (1984), 1–45.
  3. N. Sibony, Quelques problemes de prolongement de courants en analyse complexe, Duke Math. J., 52 (1985), 157–197

References


Template:Differential-geometry-stub