Arbeitspapier
Paths in Additive Cost Sharing
In this paper we develop a unified framework for the study of additive cost sharing methods. We show that any additive cost sharing method satisfying the dummy axiom can be generated by a (possibly infinite) convex combination of path generated methods. We also show that the set of scale invariant cost sharing methods can be generated by the set of scale invariant paths and the set of demand monotonic methods by the set of demand monotonic paths, both of which we construct. We first apply these results to the study a strict version of marginality, and show that none of the standard methods satisfy this requirement. We construct two new methods, which are generated by infinite sums of paths, and show that these satisfy strict marginality. We then note that the minimum of any concave functional over the set of cost sharing methods, either general, scale invariant, or demand monotonic, must be path generated, and therefore can be computed using techniques from the theory of optimal control. This allows us to provide a new characterization of the Random Order methods as the methods which minimize a lexicographic function of agents' payments according for supermodular cost functions. It may also lead to new characterizations of other interesting methods.
- Language
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Englisch
- Bibliographic citation
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Series: Working Paper ; No. 1997-06
- Classification
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Wirtschaft
- Subject
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additive methods
cost sharing
representation theorem
- Event
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Geistige Schöpfung
- (who)
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Friedman, Eric
- Event
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Veröffentlichung
- (who)
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Rutgers University, Department of Economics
- (where)
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New Brunswick, NJ
- (when)
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1997
- Handle
- Last update
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10.03.2025, 11:43 AM CET
Data provider
ZBW - Deutsche Zentralbibliothek für Wirtschaftswissenschaften - Leibniz-Informationszentrum Wirtschaft. If you have any questions about the object, please contact the data provider.
Object type
- Arbeitspapier
Associated
- Friedman, Eric
- Rutgers University, Department of Economics
Time of origin
- 1997
Other Objects (12)
Paths and Consistency in Additive Cost Sharing
Characterization of Additive Cost Sharing Methods
Weak and Strong Consistency in Additive Cost Sharing
International overhead cost sharing
Cost Sharing in Collective Contests
Transport Cost Sharing and Spatial Competition
Does cost sharing really reduce inappropriate prescriptions?
Price versus Quantity Competition with Cost Sharing
Optimization Based Characterizations of Cost Sharing Methods
Cost-sharing in the German health care system
Patient Cost-Sharing and Redistribution in Health Insurance
Too much information sharing? Welfare effects of sharing acquired cost information in oligopoly
Paths and Consistency in Additive Cost Sharing
Characterization of Additive Cost Sharing Methods
Weak and Strong Consistency in Additive Cost Sharing
International overhead cost sharing
Cost Sharing in Collective Contests
Transport Cost Sharing and Spatial Competition
Does cost sharing really reduce inappropriate prescriptions?
Price versus Quantity Competition with Cost Sharing
Optimization Based Characterizations of Cost Sharing Methods
Cost-sharing in the German health care system
Patient Cost-Sharing and Redistribution in Health Insurance
Too much information sharing? Welfare effects of sharing acquired cost information in oligopoly
Paths and Consistency in Additive Cost Sharing
Characterization of Additive Cost Sharing Methods
Weak and Strong Consistency in Additive Cost Sharing
International overhead cost sharing
Cost Sharing in Collective Contests
Transport Cost Sharing and Spatial Competition
Does cost sharing really reduce inappropriate prescriptions?
Price versus Quantity Competition with Cost Sharing
Optimization Based Characterizations of Cost Sharing Methods
Cost-sharing in the German health care system
Patient Cost-Sharing and Redistribution in Health Insurance