Cycle Spaces of Flag Domains
A Complex Geometric Viewpoint
Fels, Gregor.
creator
author.
Huckleberry, Alan.
author.
Wolf, Joseph A.
author.
SpringerLink (Online service)
text
xxu
2006
monographic
eng
access
XX, 339 p. online resource.
This monograph, divided into four parts, presents a comprehensive treatment and systematic examination of cycle spaces of flag domains. Assuming only a basic familiarity with the concepts of Lie theory and geometry, this work presents a complete structure theory for these cycle spaces, as well as their applications to harmonic analysis and algebraic geometry. Key features: * Accessible to readers from a wide range of fields, with all the necessary background material provided for the nonspecialist * Many new results presented for the first time * Driven by numerous examples * The exposition is presented from the complex geometric viewpoint, but the methods, applications and much of the motivation also come from real and complex algebraic groups and their representations, as well as other areas of geometry * Comparisons with classical Barlet cycle spaces are given * Good bibliography and index Researchers and graduate students in differential geometry, complex analysis, harmonic analysis, representation theory, transformation groups, algebraic geometry, and areas of global geometric analysis will benefit from this work.
to Flag Domain Theory -- Structure of Complex Flag Manifolds -- Real Group Orbits -- Orbit Structure for Hermitian Symmetric Spaces -- Open Orbits -- The Cycle Space of a Flag Domain -- Cycle Spaces as Universal Domains -- Universal Domains -- B-Invariant Hypersurfaces in MZ -- Orbit Duality via Momentum Geometry -- Schubert Slices in the Context of Duality -- Analysis of the Boundary of U -- Invariant Kobayashi-Hyperbolic Stein Domains -- Cycle Spaces of Lower-Dimensional Orbits -- Examples -- Analytic and Geometric Consequences -- The Double Fibration Transform -- Variation of Hodge Structure -- Cycles in the K3 Period Domain -- The Full Cycle Space -- Combinatorics of Normal Bundles of Base Cycles -- Methods for Computing H1(C; O) -- Classification for Simple with rank < rank -- Classification for rank = rank .
by Gregor Fels, Alan Huckleberry, Joseph A. Wolf.
Mathematics
Algebraic geometry
Topological groups
Lie groups
Global analysis (Mathematics)
Manifolds (Mathematics)
Functions of complex variables
Differential geometry
Quantum physics
Mathematics
Differential Geometry
Topological Groups, Lie Groups
Several Complex Variables and Analytic Spaces
Global Analysis and Analysis on Manifolds
Algebraic Geometry
Quantum Physics
QA641-670
516.36
Springer eBooks
Progress in Mathematics ; 245
9780817644796
http://dx.doi.org/10.1007/0-8176-4479-2
http://dx.doi.org/10.1007/0-8176-4479-2
100301
20180115171433.0
978-0-8176-4479-6