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E-grāmata: Multidimensional Screening

  • Formāts: PDF+DRM
  • Sērija : Studies in Economic Theory 22
  • Izdošanas datums: 19-Nov-2005
  • Izdevniecība: Springer-Verlag Berlin and Heidelberg GmbH & Co. K
  • Valoda: eng
  • ISBN-13: 9783540273134
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Multidimensional ScreeningPalielināt
  • Formāts: PDF+DRM
  • Sērija : Studies in Economic Theory 22
  • Izdošanas datums: 19-Nov-2005
  • Izdevniecība: Springer-Verlag Berlin and Heidelberg GmbH & Co. K
  • Valoda: eng
  • ISBN-13: 9783540273134
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In many industries the tariffs are not strictly proportional to the quantity purchased, i. e, they are nonlinear. Examples of nonlinear tariffs include railroad and electricity schedules and rental rates for durable goods and space. The major justification for the nonlinear pricing is the existence of private information on the side of consumers. In the early papers on the subject, private information was captured either by assuming a finite number of types (e. g. Adams and Yellen, 1976) or by a unidimensional continuum of types (Mussa and Rosen, 1978). Economics of the unidimen­ sional problems is by now well understood. The unidimensional models, however, do not cover all the situations of practical interest. Indeed, often the nonlinear tariffs specify the payment as a function of a variety of characteristics. For example, railroad tariffs spec­ ify charges based on weight, volume, and distance of each shipment. Dif­ ferent customers may value each of these characteristics differently, hence the customer's type will not in general be captured by a unidimensional characteristic and a problem of multidimensional screening arises. In such models the consumer's private information (her type) is captured by an mdimensional vector, while the good produced by the monopolist has n quality dimensions.
I Mathematical Preliminaries
1(110)
Vector Calculus
3(16)
The Main Operations of Vector Calculus: div, grad, and Δ
3(2)
Conservative Vector Fields
5(2)
Curvilinear Integrals and the Potential
7(1)
Multiple and Repeated Integrals
8(4)
The Flow of a Vector Field and the Gauss-Ostrogradsky Theorem
12(3)
The Circulation of a Vector Field and the Green Formula
15(1)
Exercises
16(2)
Bibliographic Notes
18(1)
Partial Differential Equations
19(32)
The First Order Partial Differential Equations
19(11)
The Complete Integral and the General Integral
20(1)
The Singular Integral
21(1)
The Method of Characteristics
22(2)
Compatible Systems of the First Order PDEs
24(2)
The Method of Characteristics for a Non-quasilinear First Order PDE
26(1)
Examples
27(3)
The Second Order Partial Differential Equations
30(8)
Linear Second Order Partial Differential Equations
30(1)
Boundary Value Problems for Elliptic Equations
31(1)
Examples
32(6)
Group Theoretic Analysis of Partial Differential Equations
38(9)
One Parameter Lie Groups
38(3)
Invariance of PDEs, Systems of PDEs, and Boundary Problems under Lie Groups
41(3)
Calculating a Lie Group of a PDE
44(1)
Calculating Invariants of the Lie Group
45(1)
Examples
46(1)
Exercises
47(2)
Bibliographic Notes
49(2)
Theory of Generalized Convexity
51(10)
The Generalized Fenchel Conjugates
52(3)
Generalized Convexity and Cyclic Monotonicity
55(3)
Examples
58(1)
Exercises
59(1)
Bibliographic Notes
60(1)
Calculus of Variations and the Optimal Control
61(20)
Banach Spaces and Polish Spaces
61(4)
Hilbert Spaces
65(1)
Dual Space for a Normed Space and a Hilbert Space
66(3)
Frechet Derivative of a Mapping between Normed Spaces
69(2)
Functionals and Gateaux Derivatives
71(2)
Euler Equation
73(1)
Optimal Control
74(2)
Examples
76(2)
Exercises
78(1)
Bibliographic Notes
79(2)
Miscellaneous Techniques
81(30)
Distributions as Solutions of Differential Equations
81(11)
A Motivating Example
82(1)
The Set of Test Functions and Its Dual
83(1)
Examples of Distributions
84(3)
The Derivative of a Distribution
87(1)
The Product of a Distribution and a Test Function and the Product of Distributions
88(1)
The Resultant of a Distribution and a Dilation
89(2)
Adjoint Linear Differential Operators and Generalized Solutions of the Partial Differential Equations
91(1)
Sobolev Spaces and Poincare Theorem
92(2)
Sweeping Operators and Balayage of Measures
94(2)
Coercive Functionals
96(1)
Optimization by Vector Space Methods
96(2)
Calculus of Variation Problem with Convexity Constraints
98(1)
Supermodularity and Monotone Comparative Statics
99(4)
Hausdorff Metric on Compact Sets of a Metric Space
103(4)
Generalized Envelope Theorems
107(2)
Exercises
109(1)
Bibliographic Notes
110(1)
II Economics of Multidimensional Screening
111(88)
The Unidimensional Screening Model
115(20)
Spence-Mirrlees Condition and Implementability
116(3)
The Concept of the Information Rent
119(1)
Three Approaches to the Unidimensional Relaxed Problem
119(3)
The Direct Approach
119(1)
The Dual Approach
120(1)
The Hamiltonian Approach
121(1)
Hamiltonian Approach to the Complete Problem
122(2)
Type Dependent Participation Constraint
124(2)
Random Participation Constraint
126(1)
Examples
127(6)
Exercises
133(1)
Bibliographic Notes
134(1)
The Multidimensional Screening Model
135(42)
The Genericity of Exclusion
137(4)
Generalized Convexity and Implementability
141(4)
Is Bunching Robust in the Multidimensional Case?
143(2)
Path Independence of Information Rents
145(1)
Cost Based Tariffs
146(2)
Direct Approach and Its Limitations
148(3)
Dual Approach for m = n
151(7)
The Relaxed Problem
152(1)
An Alternative Approach to the Relaxed Problem
153(1)
The Complete Problem
154(1)
The Geometry of the Participation Region
155(1)
A Sufficient Condition for Bunching
156(1)
The Extension of the Dual Approach for n > m
157(1)
Hamiltonian Approach and the First Order Conditions
158(3)
The Economic Meaning of the Lagrange Multipliers
161(1)
Symmetry Analysis of the First Order Conditions
161(5)
The Hamiltonian Approach to the Complete Problem
166(2)
Examples and Economic Applications
168(6)
Exercises
174(1)
Bibliographic Notes
174(3)
Beyond the Quasilinear Case
177(14)
The Unidimensional Case
178(3)
The Multidimensional Case
181(5)
Implementability of a Surplus Function
182(1)
Implementability of an Allocation
183(3)
The First Order Conditions for the Relaxed Problem
186(3)
Exercises
189(1)
Bibliographic Notes
189(2)
Existence, Uniqueness, and Continuity of the Solution
191(6)
Existence and Uniqueness for the Relaxed Problem
191(2)
Existence of a Solution for the Complete Problem
193(1)
Continuity of the Solution
194(2)
Bibliographic Notes
196(1)
Conclusions
197(2)
References
199


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