| 本书包含23篇几何分析和广义相对论各领域的综述性文章,作者均为该领域的知名专家。 |
| 《几何分析与相对论(英文版)》 on the positive mass, penrose, and zas inequalities in general dimension hubert l bray 1 dedication 2 introduction 3 a trio of inequalities references recent progress on the yamabe problem simon brendle, fernando c marques 1 the yamabe problem 2 the compactness conjecture 3 non-compactness results in dimension n> 25 4 a compactness result in dimension n < 24 5 the parabolic yamabe flow references some recent progress on mean curvature flow for entire lagrangian graphs jingyi chen 1 introduction 2 longtime existence with lipschitz continuous initial data 3 uniqueness and viscosity solutions .4 self-similar solutions references radial viewpoint on minimal surfaces jaigyoung choe 1 introduction 2 cone 3 horizon 4 non-euclidean space 5 ray preserving metric 6 varying curvature 7 embeddedness references minimal surfaces and mean curvature flow tobias h colding, william p minicozzi ii 1 introduction 2 harmonic functions and the heat equation 3 energy of a curve 4 birkhoff: a closed geodesic on a two sphere 5 curve shortening flow 6 minimal surfaces 7 classification of embedded minimal surfaces 8 mean curvature flow 9 width and mean curvature flow 10 singularities for mcf 11 smooth compactness theorem for self-shrinkers 12 the entropy 13 an application 14 non-compact self-shrinkers references scalar curvature and the einstein constraint equations justin corvino, daniel pollack 1 introduction 2 the constraint equations 3 a tour of asymptotically flat solutions 4 the conformal method 5 gluing constructions references on the intrinsic differentiability theorem of gromov-schoen georgios daskalopoulos, chikako mese 1 introduction 2 definitions 3 main theorem references minimal surface techniques in riemannian geometry a ilana fraser 1 introduction 2 brief overview of some geodesic methods 3 existence of minimal surfaces 4 second variation theory for minimal surfaces and applications references stability and rigidity of extremal surfaces in riemannian geometry and general relativity gregory j galloway 1 minimal hypersurfaces in manifolds of nonnegative scalar curvature 2 marginally outer trapped surfaces 3 positivity of mass for asymptotically hyperbolic manifolds references convex hypersurfaces of constant curvature in hyperbolic space bo guan, joel spruck 1 introduction 2 formulas on hypersurfaces 3 the asymptotic angle maximum principle and gradient estimates 4 curvature estimates 5 uniqueness and foliations references ricci flow in two dimensions james isenberg rafe mazzeo, natasa sesum 1 introduction 2 general considerations 3 compact surfaces 4 open surfaces 5 flows on incomplete surfaces references doubling and desingularization constructions for minimal surfaces nikolaos kapouleas 1 introduction 2 doubling constructions 3 desingularization constructions 4 minimal surfaces in the round three-sphere 5 the building blocks for the desingularization construction 6 an initial surface for the desingularization construction 7 the family of initial surfaces for the desingularization construction 8 main estimates and outline of the proof references the metric properties of lagrangians yng-ing lee 1 introduction 2 a short survey 3 definitions and properties 4 singularities and geometric measure theory 5 gluing and singular perturbation references structure of complete manifolds with positive spectrum peter li 1 introduction 2 riemannian case 3 kahler case 4 quaternionic kahler manifolds, cayley manifolds, and locally symmetric spaces 5 manifolds of finite volume 6 further generalizations references topology of sobolev mappings and associated variational problems fang hua lin introduction 1 analytical and topological properties of sobolev maps 2 singularity of energy minimizing maps 3 limits of singular sets of p-energy minimizing maps references a survey of research on boundary behavior of compact manifolds via the positive mass theorem pengzi miao 1 introduction 2 statement of the positive mass theorem 3 on compact manifolds with nonnegative scalar curvature 4 on compact manifolds with negative scalar curvature references recent progress on singularities of lagrangian mean curvature flow andre neves 1 introduction 2 preliminaries 3 basic techniques 4 applications i: blow-ups 5 applications ii: self-expanders 6 application iii: stability of singularities 7 open questions references geometric structures of collapsing riemannian manifolds i aaron naber, gang tian 1 introduction 2 structure of collapsed spaces 3 geometry of toric quotients 4 geometry of toric quotients ii 5 proof of theorems 11 and 12 6 proof of theorem 13 a geometry of quotients b orbifolds references deformation of kahler-einstein metrics xiaofeng sun, $hing-tung yam 1 introduction 2 complex structures of kahler-einstein manifolds 3 deformation of kahler-einstein metrics 4 local trivialization of polarization bundles and deformation of sections 5 curvature of l2 metrics on direct hnage sheaves 6 appendix references reverse bubbling in geometric flows peter m topping 1 introduction 2 the harmonic map flow 3 ricci flow 4 addendum -- mean curvature flow references review on harmonic diffeomorphisms between complete noncompact surfaces tom y h wan 1 introduction 2 harmonic map theory of universal teichmiiller space 3 asymptotic behavior of open harmonic embedding from the complex plane into hyperbolic plane references compactifications of complete riemannian manifolds and their applications xiaodong wang 1 introduction 2 the geometric compactification 3 the martin compactification 4 the busemann boundary 5 a comparison theorem references some aspects of weil-petersson geometry of teichmiiller spaces sumio yamada 1 introduction 2 harmonic maps into t and an application 3 finite rank properties of 4 coxeter-tits construction 5 weil-petersson geodesic completeness 6 weil-petersson geometry of the universal teichmfiller space 7 embeddings of the coxeter complex into ut 8 summary and open problems references |
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