Pluripotential Theory
Cetraro, Italy 2011, Editors: Filippo Bracci, John Erik Fornæss
Patrizio, Giorgio.
creator
author.
Błocki, Zbigniew.
author.
Berteloot, Francois.
author.
Demailly, Jean Pierre.
author.
SpringerLink (Online service)
text
gw
2013
monographic
eng
access
IX, 319 p. 11 illus., 9 illus. in color. online resource.
Pluripotential theory is a very powerful tool in geometry, complex analysis and dynamics. This volume brings together the lectures held at the 2011 CIME session on "pluripotential theory" in Cetraro, Italy. This CIME course focused on complex Monge-Ampére equations, applications of pluripotential theory to Kahler geometry and algebraic geometry and to holomorphic dynamics. The contributions provide an extensive description of the theory and its very recent developments, starting from basic introductory materials and concluding with open questions in current research.
On Bifurcation Currents in Holomorphic Families of Rational maps -- The Complex Monge–Ampère Equation in Kähler Geometry -- Applications of Pluripotential Theory to Algebraic Geometry -- Pluripotential Theory and Monge–Ampère Foliations.
by Giorgio Patrizio, Zbigniew Błocki, Francois Berteloot, Jean Pierre Demailly.
Mathematics
Geometry, algebraic
Potential theory (Mathematics)
Differential equations, partial
Geometry
Mathematics
Geometry
Algebraic Geometry
Several Complex Variables and Analytic Spaces
Potential Theory
QA440-699
516
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