The general definition of the complex Monge-Ampère operator
[Une définition générale de l'opérateur de Monge-Ampère complexe]
Cegrell, Urban
Annales de l'Institut Fourier, Tome 54 (2004), p. 159-179 / Harvested from Numdam
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On définit et étudie le domaine de définition de l'opérateur de Monge-Ampère complexe. Ce domaine est le plus général possible si on impose que l'opérateur soit continu pour les limites décroissantes. Ce domaine est donné à l'aide d'approximation par certaines fonctions plurisousharmoniques jouant le rôle de "fonctions test". On démontre des estimations, on étudie un théorème de décomposition pour les mesures positives et on résout le problème de Dirichlet.

We define and study the domain of definition for the complex Monge-Ampère operator. This domain is the most general if we require the operator to be continuous under decreasing limits. The domain is given in terms of approximation by certain " test"-plurisubharmonic functions. We prove estimates, study of decomposition theorem for positive measures and solve a Dirichlet problem.

Publié le : 2004-01-01
DOI : https://doi.org/10.5802/aif.2014
Classification:  32U15,  32W20
Mots clés: opérateur de Monge-Ampère complexe, fonction plurisousharmonique 
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     author = {Cegrell, Urban},
     title = {The general definition of the complex Monge-Amp\`ere operator},
     journal = {Annales de l'Institut Fourier},
     volume = {54},
     year = {2004},
     pages = {159-179},
     doi = {10.5802/aif.2014},
     zbl = {1065.32020},
     language = {en},
     url = {http://dml.mathdoc.fr/item/AIF_2004__54_1_159_0}
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Cegrell, Urban. The general definition of the complex Monge-Ampère operator. Annales de l'Institut Fourier, Tome 54 (2004) pp. 159-179. doi : 10.5802/aif.2014. http://gdmltest.u-ga.fr/item/AIF_2004__54_1_159_0/

[1] E. Bedford; John Erik Fornaess Survey of pluripotential theory. Several complex variables, Proceedings of the Mittag-Leffler Inst. (1987-88), Princeton University Press (Mathematical Notes) Tome 38 (1994), pp. 48-95 | MR 1207855 | Zbl 0786.31001

[2] E. Bedford; B.A. Taylor The Dirichlet problem for a complex Monge-Ampère equation, Invent. Math, Tome 37 (1976), pp. 1-44 | MR 445006 | Zbl 0315.31007

[3] E. Bedford; B.A. Taylor A new capacity for plurisubharmonic functions, Acta Math, Tome 149 (1982), pp. 1-40 | MR 674165 | Zbl 0547.32012

[4] Z. Blocki Estimates for the complex Monge-Ampère operator, Bull. Pol. Acad. Sci. Math, Tome 41 (1993), pp. 151-157 | MR 1414762 | Zbl 0795.32003

[5] Z. Blocki The complex Monge-Ampère operator in hyperconvex domains, Annali della Scuola Normale Superiore di Pisa, Tome 23 (1996) no. 4, pp. 721-747 | Numdam | MR 1469572 | Zbl 0878.31003

[6] M. Carlehed Potentials in pluripotential theory, Ann. de la Fac. Sci. de Toulouse (6), Tome 8 (1999) no. 3, pp. 439-469 | Numdam | MR 1751172 | Zbl 0961.31005

[7] U. Cegrell Pluricomplex energy, Acta Mathematica, Tome 180 (1998) no. 2, pp. 187-217 | MR 1638768 | Zbl 0926.32042

[8] U. Cegrell; Gilles Raby And Frédéric Symesak Explicit calculation of a Monge-Ampère measure, Actes des rencontres d'analyse complexe (Université de Poitiers, 25-28 mars 1999), Poitiers: Atlantique (2000), pp. 39-42 | MR 1944194 | Zbl 1036.32023

[9] U. Cegrell Convergence in capacity (2001) (Isaac Newton Institute for Mathematical Sciences, Preprint Series NI01046-NPD, Cambridge)

[10] U. Cegrell Exhaustion functions for hyperconvex domains (2001) (Research reports, No 10, Mid Sweden University)

[11] U. Cegrell; S. Kolodziej The Dirichlet problem for the complex Monge-Ampère operator: Perron classes and rotation invariant measures, Michigan. Math. J, Tome 41 (1994), pp. 563-569 | MR 1297709 | Zbl 0820.31005

[12] D. Coman Integration by parts for currents and applications to the relative capacity and Lelong numbers, Mathematica, Tome 39(62) (1997) no. 1, pp. 45-57 | MR 1622653 | Zbl 0914.32003

[13] J.-P. Demailly Mesures de Monge-Ampère et mesures pluriharmoniques, Math. Z, Tome 194 (1987), pp. 519-564 | MR 881709 | Zbl 0595.32006

[14] N. Kerzman; J.-P. Rosay Fonctions plurisousharmoniques d'exhaustion bornées et domaines taut, Math. Ann, Tome 257 (1981), pp. 171-184 | MR 634460 | Zbl 0451.32012

[15] S. Kolodziej The complex Monge-Ampère equation, Acta Mathematica, Tome 180 (1998), pp. 69-117 | MR 1618325 | Zbl 0913.35043

[16] N. Sibony Quelques problèmes de prolongement de courants en analyse complexe, Duke Math. J, Tome 52 (1985), pp. 157-197 | MR 791297 | Zbl 0578.32023

[17] J. Siciak Extremal plurisubharmonic functions and capacities in n , Sophia Kokyuroko in Mathematics (1982) | Zbl 0579.32025

[18] J.B. Walsh Continuity of envelopes of plurisubharmonic functions, J. Math. Mech, Tome 18 (1968), pp. 143-148 | MR 227465 | Zbl 0159.16002

[19] F. Wikström Jensen measures and boundary values of plurisubharmonic functions, Ark. Mat, Tome 39 (2001), pp. 181-200 | MR 1821089 | Zbl 1021.32014

[20] Y. Xing Complex Monge-Ampère equations with a countable number of singular points, Indiana Univ. Math. J, Tome 48 (1999), pp. 749-765 | MR 1722815 | Zbl 0934.32027

[21] A. Zeriahi Pluricomplex Green functions and the Dirichlet problem for the Complex Monge-Ampère operator, Michigan Math. J, Tome 44 (1997), pp. 579-596 | MR 1481120 | Zbl 0899.31007