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· 분류 : 외국도서 > 과학/수학/생태 > 수학 > 기하학 > 기하학 일반
· ISBN : 9781439834596
· 쪽수 : 432쪽
· 출판일 : 2010-07-02
목차
Introduction
Sobolev Inequalities in the Euclidean Space
Weak derivatives and Sobolev space Wk,p(D), D subset Rn
Main imbedding theorem for W01,p(D)
Poincare inequality and log Sobolev inequality
Best constants and extremals of Sobolev inequalities
Basics of Riemann Geometry
Riemann manifolds, connections, Riemann metric
Second covariant derivatives, curvatures
Common differential operators on manifolds
Geodesics, exponential maps, injectivity radius etc.
Integration and volume comparison
Conjugate points, cut-locus, and injectivity radius
Bochner?Weitzenbock type formulas
Sobolev Inequalities on Manifolds
A basic Sobolev inequality
Sobolev, log Sobolev inequalities, heat kernel
Sobolev inequalities and isoperimetric inequalities
Parabolic Harnack inequality
Maximum principle for parabolic equations
Gradient estimates for the heat equation
Basics of Ricci Flow
Local existence, uniqueness and basic identities
Maximum principles under Ricci flow
Qualitative properties of Ricci flow
Solitons, ancient solutions, singularity models
Perelman’s Entropies and Sobolev Inequality
Perelman’s entropies and their monotonicity
(Log) Sobolev inequality under Ricci flow
Critical and local Sobolev inequality
Harnack inequality for the conjugate heat equation
Fundamental solutions of heat type equations
Ancient κ Solutions and Singularity Analysis
Preliminaries
Heat kernel and κ solutions
Backward limits of κ solutions
Qualitative properties of κ solutions
Singularity analysis of 3-dimensional Ricci flow
Sobolev Inequality with Surgeries
A brief description of the surgery process
Sobolev inequality, little loop conjecture, and surgeries
Applications to the Poincare Conjecture
Evolution of regions near surgery caps
Canonical neighborhood property with surgeries
Summary and conclusion
Bibliography
Index
