内容简介
This book contains many substantial papers from distinguished speakers of a conference "Geometric Analysis: Present and Future" and an overview of the works of Professor Shing-Tung Yau. Contributors include E. Wit-ten, Y.T. Siu, R. Hamilton, H. Hitchin, B. Lawson, A. Strominger, C. Vafa, W. Schmid, V. Guillemin, N. Mok, D. Christodoulou. This is a valuable reference that gives an up-to-dated summary of geometric analysis and its applications in many different areas of mathematics.
目录
part 1 summary of and commentaries on the work of shing-tung yau
curriculum vitae of shing-tung yau
a brief overview of the work of shing-tung yau
lizhen ji
1 introduction
2 a summary of some major works of yau
3 topics yau has worked on
4 basics on kaihler-einstein metrics and calabi conjectures
5 some applications of kaihler-einstein metrics and calabi-yau manifolds
6 harmonic maps
7 rigidity of kahler manifolds
8 super-rigidity of spaces of nonpositive curvature
9 survey papers by yau
10 open problems by yau
ll books written and co-written by yau
12 books edited and co-edited by yau
13 ph.d. students of yau
14 partial list of papers and books of yau
references
yau's work on filtering problem
.wen-lin chiou, jie huang and lizhen ji
1 filtering problem
2 yau's two methods in solving nonlinear filtering problem
2.1 direct method
2.2 algorithm for real time solution without memory
references
from continues to discrete - yau's work on graph theory
fan chung
yau's work on moduli, periods, and mirror maps for calabi-yau manifolds
charles f. doran
1 construction of calabi-yau threefolds
2 picard-fuchs equations and the mirror map
3 arithmetic properties of mirror maps
4 periods and moduli of complex tori and k3 surfaces
references
review on yau's work on the coupled einstein equations and the wave dynamics in the kerr geometry
felix finster
1 coupling the einstein equations to non-abelian gauge fields and dirac spinors
2 the dynamics of linear waves in the kerr geometry
references
the work of witten and yau on the ads/cft correspondence
gregory j. galloway
1 introduction
2 the witten-yau results on ads/cft
3 further developments
references
yau's work on heat kernels
alexander grigor'yan
1 the notion of the heat kernel
2 estimating heat kernels
3 some applications of the heat kernel estimates
references
yau's contributions to engineering fields
xianfeng david gu
1 introduction
2 computational conformal geometry
2.1 conformal structure
2.2 harmonic map
2.3 surfacericci flow
2.4 conformal mappings
2.5 quasi-conformal mappings
2.6 teichmiiller space
3 geometric acquisition
4 computer graphics
5 geometric modeling
6 medical imaging
7 computer vision
8 wireless sensor network
9 summary
references
the syz proposal
naichung conan leung
1 pre-syz
2 the birth of syz
3 the growing up of syz
3.1 special lagrangian geometry
3.2 special lagrangian fibrations
3.3 affine geometry
3.4 syz transformation
4 future of syz
references
yau- zaslow formula
naichung conan leung
yau's work on function theory: harmonic functions, eigenvalues and the heat equation
peter li
a vision of yau on mirror symmetry
bong lian
1 enumerative geometry
2 geometry of calabi-yau manifolds and their moduli spaces
references
yau's work on group actions
kefeng liu
cheng and yau's work on the monge-ampere equation and affine geometry
john loftin, xu-jia wang and deane yang
1 introduction
2 the monge-ampere equation
3 cheng and yau's work on the dirichlet problem
4 subsequent work on the monge-ampere equation
5 affine spheres
6 hyperbolic affine spheres and real monge-ampere equations
7 affine manifolds
8 maximal hypersurfaces in minkowski space
9 the minkowski problem
10 convex geometry without smoothness assumptions
10.1 support function
10.2 invariance properties of the support function
10.3 minkowski sum
10.4 mixed volume
10.5 surface area measure
10.6 invariance properties of the surface area measure
10.7 the minkowski problem
10.8 the brunn-minkowski inequality
10.9 uniqueness in the minkowski problem
10.10 variational approach to the minkowski problem
11 convex geometry with smoothness assumptions
11.1 the inverse gauss map
11.2 the inverse second fundamental form
11.3 the curvature function
11.4 the surface area measure
11.5 the minkowski problem
11.6 the minkowski problem as a pde
12 cheng and yau's regularity theorem for the minkowski problem.
12.1 statement
12.2 sketch of proof
13 generalizations of the minkowski problem
references
yau's work on minimal surfaces and 3-manifolds
feng luo
the work of schoen and yau on manifolds with positive scalar curvature
william, minicozzi ii
0 introduction
1 topological restrictions on manifolds with positive scalar curvature
1.1 stable minimal surfaces and scalar curvature
1.2 inductively extending this to higher dimensions
1.3 preserving positive scalar curvature under surgery
2 locally conformally flat manifolds
2.1 the new invariants
2.2 a positive mass theorem
references
yau's contributions to algebraic geometry ndrey todorov
1 introduction
1.1 yau's program-plenary talk at icm 1982
2 monge-ampere equation and applications to algebraic geometry
2.1 solution of the calabi conjecture
2.2 existence of canonical metrics on zariski open sets
3 stable vector bundles over kahler manifolds
3.1 donaldson-uhlenbeek-yau theorem
3.2 applications to kodaira's classification of surfaces
4 moduli spaces
4.1 existence of kiihler-einstein metrics on domain of holomorphy and teichmfiller spaces
4.2 moduli spaces of k3 surfaces
4.3 moduli spaces of cy manifolds
4.4 generalization of shwarz lemma by yau and baily-borel compactification
5 contributions of yau to string theory
5.1 mirror symmetry and syz conjecture
5.2 large radius limit
5.3 string theory and number theory
5.4 rational curves on algebraic k3 surfaces
6 rigidity
6.1 yau's conjecture about rigidity of some complex manifolds
6.2 geometric proof of margulis' superrigidity
6.3 geometric proof of kazhdan theorem about galois
conjugation of shimura varieties
references
yau's work on positive mass theorems
mu-tao wang
yan's conjecture on kaihler-einstein metric and stability
xiaowei wang
on yau's pioneer contribution on the frankel conjecture and
related questions
fangyang zheng
yau's work on inequalities between chern numbers and
uniformization of complex manifolds
kang zuo
part 2 differential geometry and differential equations
geometry of complete gradient shrinking ricci solitons
huai-dong cao
1 gradient shrinking ricci solitons
2 classification of 3-dimensional gradient shrinking solitons
3 geometry of complete gradient solitons
references
the formation of black holes in general relativity
demetrios christodoulou
pagerank as a discrete green's function
fan chung
1 introduction
2 preliminaries
3 dirichlet eigenvalues
4 connections between pagerank and discrete green's function
5 relating the cheeger constant to the pagerank
6 relating the pagerank of a graph to that of its subgraphs
7 the pagerank and the hitting time
references
a geodesic equation in the space of sasakian metrics
pengfei guan and xi zhang
some inverse spectral results for the two-dimensional schrodinger operator
v. cuillemin and a. uribe
1 introduction
2 the weyl calculus
3 some bracket identities
4 the quantum birkhoff canonical form
references
li-yau estimates and their harnack inequalities
richard s. hamilton
1 the heat equation
2 the dirichlet problem for the heat equation
3 the heat equation in the plane
4 the castaway
5 endangered species equation
6 the migration equation
7 motion of a curve by its curvature
8 motion of a surface by its mean curvature
9 motion of a surface by its gauss curvature
references
plurisubharmonicity in a general geometric context
f. reese harvey and h. blaine lawson, jr
1 introduction
2 geometrically defined plurisubharmonic functions
3 more general plurisubharmonic functions defined by an elliptic c
几何与分析(第1卷) [Geometry and Analysis(Vol.I)] 下载 mobi epub pdf txt 电子书 格式
几何与分析(第1卷) [Geometry and Analysis(Vol.I)] 下载 mobi pdf epub txt 电子书 格式 2024
几何与分析(第1卷) [Geometry and Analysis(Vol.I)] mobi epub pdf txt 电子书 格式下载 2024