دانلود کتاب Comparison Finsler Geometry (Springer Monographs in Mathematics)
کتاب مقایسه هندسه فینسلر (تکنگ های اسپرینگر در ریاضیات) نسخه زبان اصلی
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توضیحاتی در مورد کتاب Comparison Finsler Geometry (Springer Monographs in Mathematics)
نام کتاب : Comparison Finsler Geometry (Springer Monographs in Mathematics)
ویرایش : 1st ed. 2021
عنوان ترجمه شده به فارسی : مقایسه هندسه فینسلر (تکنگ های اسپرینگر در ریاضیات)
سری :
نویسندگان : Shin-ichi Ohta
ناشر : Springer
سال نشر : 2021
تعداد صفحات : 324
ISBN (شابک) : 3030806499 , 9783030806491
زبان کتاب : English
فرمت کتاب : pdf
حجم کتاب : 2 مگابایت
بعد از تکمیل فرایند پرداخت لینک دانلود کتاب ارائه خواهد شد. درصورت ثبت نام و ورود به حساب کاربری خود قادر خواهید بود لیست کتاب های خریداری شده را مشاهده فرمایید.
فهرست مطالب :
Preface
Contents
List of Definitions and Formulas
Part I
Part II
Part I Foundations of Finsler Geometry
1 Warm-Up: Norms and Inner Products
1.1 Norms and Inner Products
1.2 Three Characterizations of Inner Products
1.2.1 Sharp Uniform Convexity and Smoothness
1.2.2 Smoothness at the Origin
1.2.3 Center of Circumscribed Triangle
2 Finsler Manifolds
2.1 Minkowski Normed Spaces
2.2 Euler\'s Homogeneous Function Theorem
2.3 Finsler Manifolds
2.4 Asymmetric Distance and Geodesics
2.5 Reverse Finsler Structures
3 Properties of Geodesics
3.1 Fundamental and Cartan Tensors
3.2 Dual Norms and the Legendre Transformation
3.3 The Geodesic Equation
3.4 The Exponential Map
3.5 Completenesses and the Hopf–Rinow Theorem
4 Covariant Derivatives
4.1 The Geodesic Equation Revisited
4.2 Covariant Derivatives
4.3 Covariant Derivatives Along Curves
4.4 The Chern Connection
5 Curvature
5.1 Jacobi Fields and the Curvature Tensor
5.2 Properties of the Curvature Tensor
5.3 Flag and Ricci Curvatures and Their Characterizations
5.4 Further Properties of the Curvature Tensor
6 Examples of Finsler Manifolds
6.1 Minkowski Normed Spaces
6.2 Finsler Manifolds of Constant Curvature
6.3 Berwald Spaces
6.3.1 Isometry of Tangent Spaces and Its Applications
6.3.2 T-Curvature
6.3.3 Characterizations of Berwald Spaces
6.4 Randers Spaces
6.5 Hilbert and Funk Geometries
6.6 Teichmüller Space
7 Variation Formulas for Arclength
7.1 First Variation Formula
7.2 Second Variation Formula
7.3 Cut Points and Conjugate Points
8 Some Comparison Theorems
8.1 The Bonnet–Myers Theorem
8.2 The Cartan–Hadamard Theorem
8.3 Uniform Convexity and Smoothness
8.3.1 Background: k-Convexity and k-Concavity
8.3.2 Uniform Convexity and Smoothness Constants
8.3.3 T-Curvature Revisited
8.3.4 k-Concavity of (M,F)
8.3.5 k-Convexity of (M,F)
8.4 Busemann NPC for Berwald Spaces
Part II Geometry and Analysis of Weighted Ricci Curvature
9 Weighted Ricci Curvature
9.1 Measures on Finsler Manifolds
9.2 Riemannian Weighted Ricci Curvature
9.3 Finsler Weighted Ricci Curvature
9.4 Volume and Diameter Comparison Theorems
10 Examples of Measured Finsler Manifolds
10.1 Minkowski Normed Spaces
10.2 Berwald Spaces
10.3 Randers Spaces
10.3.1 Properties of the S-Curvature
10.3.2 Randers Spaces of Vanishing S-Curvature
10.4 Hilbert and Funk Geometries
11 The Nonlinear Laplacian
11.1 Energy Functional and Sobolev Spaces
11.2 Laplacian and Harmonic Functions
11.3 Laplacian Comparison Theorem
11.4 Linearized Laplacians
12 The Bochner–Weitzenböck Formula
12.1 Hessian
12.2 Pointwise Formula
12.3 Integrated Formula
12.4 Improved Bochner Inequality
13 Nonlinear Heat Flow
13.1 Global Solutions
13.2 Existence
13.3 Large Time Behavior
13.4 Regularity
13.5 Linearized Heat Semigroups and Their Adjoints
14 Gradient Estimates
14.1 L2-Gradient Estimate
14.2 L1-Gradient Estimate
14.3 Characterizations of Lower Ricci Curvature Bounds
14.4 The Li–Yau Estimates
15 Bakry–Ledoux Isoperimetric Inequality
15.1 Background
15.2 Poincaré–Lichnerowicz Inequality and Variance Decay
15.3 The Key Estimate
15.4 Proof of Theorem 15.1
16 Functional Inequalities
16.1 Logarithmic Sobolev Inequality
16.1.1 Entropy Decay
16.1.2 Logarithmic Sobolev Inequality
16.2 Beckner Inequality
16.3 Sobolev Inequality
16.3.1 Logarithmic Entropy-Energy and Nash Inequalities
16.3.2 Sharp Sobolev Inequality
16.3.3 Addendum to the Proof of Theorem 16.17
Part III Further Topics
17 Splitting Theorems
17.1 Busemann Functions
17.2 Diffeomorphic Splitting
17.3 The Berwald Case
18 Curvature-Dimension Condition
18.1 Optimal Transport Theory
18.2 Curvature-Dimension Condition
18.3 Brunn–Minkowski Inequality
18.4 Analytic Applications
18.4.1 Functional Inequalities
18.4.2 Concentration of Measures
18.5 Further Developments
18.5.1 Riemannian Curvature-Dimension Condition
18.5.2 Heat Flow as Gradient Flow
18.5.3 Measure Contraction Property
19 Needle Decompositions
19.1 Lipschitz Functions and Optimal Transports
19.1.1 Transport Rays
19.1.2 Cyclical Monotonicity
19.2 Construction of Needle Decompositions
19.2.1 Transport Sets
19.2.2 Disintegration
19.2.3 Conditioned Version
19.3 Properties of Needles
19.4 Isoperimetric Inequalities
19.5 Further Applications
References
Index