The problem of allocating the production cost of a finite bundle of divisible consumption goods or services by means of per unit costs or prices is a basic problem in economics. Recently an axiomatic approach has been proposed Billera and Heath [Billera, L. J., D. C. Heath. 1981. Allocation of shared costs: a set of Axioms yielding a unique procedure. Math. Oper. Res.7 32--39.] and Mirman and Tauman [Mirman, L. J., Y. Tauman. 1981. Demand compatible equitable cost sharing prices. Math. Oper. Res.7 40--56.] in which one considers a class of cost problems and studies the mappings from that class of cost problems to prices by means of the properties these prices satisfy. We look for a list of properties on the class of cost problems and the price mechanism that imply the “diagonality” of the price mechanism.
[1]
Dov Samet,et al.
The Determination of Marginal-Cost Prices Under a Set of Axioms
,
1982
.
[2]
Louis J. Billera,et al.
Allocation of Shared Costs: A Set of Axioms Yielding A Unique Procedure
,
1982,
Math. Oper. Res..
[3]
Yair Tauman,et al.
The Existence of Nondiagonal Axiomatic Values
,
1976,
Math. Oper. Res..
[4]
L. Shapley,et al.
Values of Non-Atomic Games
,
1974
.
[5]
Yair Tauman.
A Nondiagonal Value on a Reproducing Space
,
1977,
Math. Oper. Res..
[6]
Yair Tauman,et al.
Demand Compatible Equitable Cost Sharing Prices
,
1982,
Math. Oper. Res..
[7]
Abraham Neyman,et al.
Continuous Values are Diagonal
,
1977,
Math. Oper. Res..