Numerical Approximations to Extremal Metrics on Toric Surfaces
R.S.Bunch.Simon K.Donaldson
1 Introduction
2 The set-up
2.1 Algebraic metrics
2.2 Decomposition of the curvature tensor
2.3 Integration
3 Numerical algorithms:balanced metrics and refined approximations
4 Numerical results
4.1 The hexagon
4.2 The pentagon
4.3 The octagon
4.4 The heptagon
5 Conclusions
References
Kaihler Geometry on Toric Manifolds,and some other Manifolds with Large Symmetry
Simon K.Donaldson
Introduction
1 Background
1.1 Gauge theory and holomorphic bundles
1.2 Symplectic and complex structures
1.3 The equations
2 Toric manifolds
2.1 Local difierential geometry
2.2 The global structure
2.3 Algebraic metrics and asymptotics
2.4 Extremal metrics on toric varieties
3 Toric Fano manifolds
3.1 The Kghler-Ricci soliton equation
3.2 Continuity method,convexity and a fundamental inequality
3.3 A priori estimate
3.4 The method of Wang and Zhu
4 Variants of toric difierential geometry
4.1 Multiplicity-free manifolds
4.2 Manifolds with a dense orbit
5 The Mukai-Umemura manifold and its deformations
5.1 Mukai'S construction
5.2 Topological and symplectic picture
5.3 Defclrmations
5.4 The a-invariant
References
Gluing Constructions of Special Lagrangian Cones
Mark Haskins.Nikolaos Kapouleas
1 Introduction
2 Special Lagrangian cones and special Legendrian submanifolds of
S2n-1
3 Cohomogeneity one special Legendrian submanifolds of S2n-1
4 Construction of the initial almost special Legendrian submanifolds
5 The symmetry group and the general framework for correcting the initial surfaces
6 The linearized equation
7 Using the Geometric Principle to prescribe the extended substitute kernel
8 The main results
A Symmetries and quadratics
References
Harmonic Mappings
Jurgen Jost
1 Introduction
2 Harmonic mappings from the perspective of Riemannian geometry
2.1 Harmonic mappings between Riemannian manifolds:definitions and properties
2.2 The heat flow and harmonic mappings into nonpositively curved manifolds
2.3 Harmonic mappings into convex regions and applications to the Bernstein problem
3 Harmonic mappings from the perspective of abstract analysis and convexity theory
3.1 Existence
3.2 Regularity
3.3 Uniqueness and some applications
4 Harmonic mappings in Kghler and algebraic geometry
4.1 Rigidity and superrigidity
4.2 Harmonic maps and group representations
4.3 Kghler groups
4.4 Quasiprojective varieties and harmonic mappings of infinite energy
5 Harmonic mappings and Riemann surfaces
5.1 Families of Riemann surfaces
……
Harmonic Functions Riemannian Manifodlds
Complexity of Partial Differential Equations
Variational Principles on Triangulated Surfaces
Asymptotic Structures in the Geometry of Stability and Extremal Metrics
Stable Constant Mean Curvature Surfaces
A General Asymptotic Decay Lemma for Elliptic Problems
Uniformization of Open Nonnegatively Curved Kahler Manifolds in Higher Dimensions
Geometry of Measures: Harmonic Analysis Meets Geometric Measure Theory
The Monge-Ampere Eequation and its Geometric Aapplications
Lectures on Mean Curvature Flows in Higher Codimensions
Local and Global Analysis of Eigenfunctions on Riemannian Manifolds
Yau's Form of Schwarz Lemma and Arakelov Inequality On Moduli Spaces of Projective Manifolds
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