Using generalized Riemann maps, normal forms for almost complex domains (D, J) with singular foliations by stationary disks are defined. Such normal forms are used to construct counterexamples and to determine intrinsic conditions under which the stationary disks are extremal disks for the Kobayashi metric or determine solutions to almost complex Monge-Ampere equation. The research that lead to the present paper was partially supported by a grant of the group GNSAGA of INdAM
Stationary disks and Green functions in almost complex domains
SPIRO, Andrea
2013-01-01
Abstract
Using generalized Riemann maps, normal forms for almost complex domains (D, J) with singular foliations by stationary disks are defined. Such normal forms are used to construct counterexamples and to determine intrinsic conditions under which the stationary disks are extremal disks for the Kobayashi metric or determine solutions to almost complex Monge-Ampere equation. The research that lead to the present paper was partially supported by a grant of the group GNSAGA of INdAMFile in questo prodotto:
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