Complex Analysis III
Complex Analysis III Proceedings of the Special Year held at the University of Maryland, College Park, 1985–86 / [electronic resource] :
edited by Carlos A. Berenstein.
- XII, 352 p. online resource.
- Lecture Notes in Mathematics, 1277 0075-8434 ; .
- Lecture Notes in Mathematics, 1277 .
Some recent successes in value-distribution theory -- Bergman — Szegö type theory for CR structures -- Regular complex geodesics for the domain Dn=((z1, ..., zn) ? ?n : |z1| + ... + |zn| < 1) -- Subelliptic, second order differential operators -- Recent results on homogeneous complex manifolds -- Kähler-Einstein metrics for the case of positive first chern class -- Algebroid reduction of Nevanlinna theory -- An infinite-dimensional generalization of the Shilov boundary and infinite dimensional analytic structures in the spectrum of a uniform algebra -- New relations between Sibony-Basener boundaries -- Picard-fuchs differential equations for the quadratic periods of Abelian integrals of the first kind -- Holomorphic families of holomorphic isometries -- Complex Monge-Ampère equation and related problems -- Liouville theorems -- A final word.
9783540478935
10.1007/BFb0078241 doi
Global analysis (Mathematics).
Topological Groups.
Analysis.
Topological Groups, Lie Groups.
QA299.6-433
515
Some recent successes in value-distribution theory -- Bergman — Szegö type theory for CR structures -- Regular complex geodesics for the domain Dn=((z1, ..., zn) ? ?n : |z1| + ... + |zn| < 1) -- Subelliptic, second order differential operators -- Recent results on homogeneous complex manifolds -- Kähler-Einstein metrics for the case of positive first chern class -- Algebroid reduction of Nevanlinna theory -- An infinite-dimensional generalization of the Shilov boundary and infinite dimensional analytic structures in the spectrum of a uniform algebra -- New relations between Sibony-Basener boundaries -- Picard-fuchs differential equations for the quadratic periods of Abelian integrals of the first kind -- Holomorphic families of holomorphic isometries -- Complex Monge-Ampère equation and related problems -- Liouville theorems -- A final word.
9783540478935
10.1007/BFb0078241 doi
Global analysis (Mathematics).
Topological Groups.
Analysis.
Topological Groups, Lie Groups.
QA299.6-433
515