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General Equilibrium Theory of Value

Yves Balasko
Publisher: 
Princeton University Press
Publication Date: 
2011
Number of Pages: 
175
Format: 
Hardcover
Price: 
39.95
ISBN: 
9780691146799
Category: 
Monograph
We do not plan to review this book.

Preface xi

CHAPTER 1: Goods and Prices 1
1.1 Introduction 1
1.2 Goods 1
1.3 Prices 2
1.4 Relative Prices 2
1.5 Price Normalization 3
1.6 Notes and Comments 4

CHAPTER 2: Preferences and Utility 5
2.1 Consumption Sets 5
2.2 Binary Relations 6
2.3 Consumers' Preferences 8
2.4 Smooth Utility Functions 14
2.5 Conclusion 18
2.6 Notes and Comments 18

CHAPTER 3: Demand Functions 19
3.1 Introduction 19
3.2 Constrained Utility Maximization 19
3.3 The Individual Demand Function 23
3.4 Properties of Demand Functions in D 24
3.5 Demand-based Consumer Theory 31
3.6 Conclusion 36
3.7 Notes and Comments 36

CHAPTER 4: The Exchange Model 37
4.1 Introduction 37
4.2 The Sets E, Er, and Ec of m-tuples of Demand Functions Defining the Exchange Model 38
4.3 The Exchange Model 39
4.4 Equilibrium Equation 39
4.5 The Equilibrium Manifold and the Natural Projection 41
4.6 The Smooth Equilibrium Manifold 42
4.7 Smoothness of the Natural Projection 44
4.8 Critical and Regular Points and Values 44
4.9 Notes and Comments 46

CHAPTER 5: The Equilibrium Manifold 47
5.1 Introduction 47
5.2 Global Properties and Their Interest 47
5.3 The No-trade Equilibria 49
5.4 The Fibers of the Equilibrium Manifold 50
5.5 The Equilibrium Manifold as a Collection of Linear Fibers Parameterized by the No-trade Equilibria 52
5.6 A Picture of the Equilibrium Manifold 53
5.7 Diffeomorphism with R_m 53
5.8 Conclusion 54
5.9 Notes and Comments 55

CHAPTER 6: Applications of the Global Coordinate System 56
6.1 Introduction 56
6.2 Coordinate System (A) 56
6.3 Coordinate System (B) 57
6.4 Formulas of the Natural Projection 57
6.5 The Jacobian Matrix of Aggregate Excess Demand 58
6.6 Conclusion 61
6.7 Notes and Comments 61

CHAPTER 7: The Broad Picture 62
7.1 Introduction 62
7.2 Properness 62
7.3 Smooth Selection at a Regular Equilibrium 63
7.4 The Equilibrium Manifold over Regular Economies 64
7.5 Genericity of Regular Economies 67
7.6 The Degrees of the Natural Projection 69
7.7 Conclusion 72
7.8 Notes and Comments 73

CHAPTER 8: The Fine Picture 74
8.1 Introduction 74
8.2 Aggregate Demand at a No-trade Equilibrium 74
8.3 Regularity of the No-trade Equilibria 75
8.4 The Set of Equilibrium Allocations 75
8.5 Economies with a Unique Equilibrium 78
8.6 Degree of the Natural Projection 79
8.7 The Set of Regular Equilibria 79
8.8 Conclusion 81
8.9 Notes and Comments 81

CHAPTER 9: Production with Decreasing Returns 82
9.1 Introduction 82
9.2 Production Sets: Definitions 82
9.3 Production Sets: Main Properties 84
9.4 The Firm's Objective Function 89
9.5 The Strict Decreasing Returns to Scale Firm 90
9.6 The Net Supply Function as a Primitive Concept 92
9.7 Conclusion 94
9.8 Notes and Comments 95

CHAPTER 10: Equilibrium with Decreasing Returns 96
10.1 Introduction 96
10.2 The General Equilibrium Model with Private Ownership of Decreasing Returns to Scale Firms 96
10.3 Production Adjusted Demand Functions 98
10.4 The Equivalent Exchange Model 101
10.5 Properness of the Natural Projection 103
10.6 Conclusion 107
10.7 Notes and Comments 107

CHAPTER 11: Production with Constant Returns 108
11.1 Introduction 108
11.2 Production Sets 109
11.3 The Net Supply Correspondence 112
11.4 Three Examples 115
11.5 Net Supply Correspondence of a Smooth Constant Returns to Scale Firm 118
11.6 The Graph of the Net Supply Correspondence 120
11.7 Conclusion 123
11.8 Notes and Comments 123

CHAPTER 12: Equilibrium with Constant Returns 124
12.1 Introduction 124
12.2 Decreasing and Constant Returns: General Case 124
12.3 Constant Returns: Reduced Form 125
12.4 Equilibria of the Model N 126
12.5 The Equilibrium Manifold Approach 126
12.6 The Equilibrium Manifold for the Model N 127
12.7 The Natural Projection 133
12.8 Regular and Critical Equilibria 134
12.9 Degrees of the Natural Projection 137
12.10 Regular and Singular Economies 138
12.11 Uniqueness of Equilibrium over ?(T) 139
12.12 The Natural Projection as a Finite Covering of the Set of Regular Economies 141
12.13 Values of the Natural Projection Degrees 143
12.14 Conclusion 144
12.15 Notes and Comments 144
Postscript 145

APPENDIX A: Notation 149
A.1 Points, Vectors, Inner Product 149
A.2 Gradient 149
A.3 Second-Order Derivatives and the Hessian Matrix of a Smooth Function 150

APPENDIX B: Point-set Topology 151
B.1 Proper Maps 151

APPENDIX C: Smooth Manifolds 152
C.1 The Implicit Function Theorem 152
C.2 Smooth Manifolds and Submanifolds 152
C.3 Smooth Mappings, Immersions, and Submersions 153

APPENDIX D: Singularities of Smooth Maps 155
D.1 Critical and Regular Points 155
D.2 Singular and Regular Values 155
D.3 Sard's Theorem 156
D.4 The Regular Value Theorem 156
D.5 The Case where dimX = dimY 156
D.6 Coverings 157
D.7 Surjectivity of Maps with Non-Zero Modulo 2 Degree 157

APPENDIX E: Convexity 159
E.1 Convex and Strictly Convex Sets 159
E.2 Quasi-concave Functions 159
E.3 Smooth Quasi-concavity and Second-Order Derivatives 162
E.4 Bordered Hessian of a Smoothly Quasi-concave Function 164
E.5 Recession Cone of a Convex Set 165

APPENDIX F: Miscellany 166
F.1 Dimension of Semi-algebraic Sets 166
References 167
Index 171