A quasi-linear social choice problem is concerned with choosing one among a finite set of public projects and determining side payments among agents to cover the cost of the project, assuming each agent has quasi-linear preferences. We first investigate the logical relations between various axioms in this context. They are: agreement, separability, population solidarity, consistency, converse consistency, and population-and-cost solidarity. Also, on the basis of these axioms, we present alternative characterizations of egalitarian solutions; each solution assigns to each agent an equal share of the surplus derived from the public project over some reference utility level, but uses a different method to compute the reference utility level.
Several situations of conflict between basic social principles can crop up during a consensus search...
Abstract We introduce the concept of the consensus functional equation, for a bi-variate map defined...
In 1985 Aumann axiomatized the Shapley NTU value by non-emptiness, efficiency, unanimity, scale cova...
A quasi-linear social choice problem is defined as selecting one (among finitely many) indivisible p...
We consider the class of binary social choice problems. A society must choose one of two public proj...
A binary choice problem with side-payments and quasi-linear utilities is considered. We study two co...
A binary choice problem with side-payments and quasi-linear utilities is considered. We study two co...
A public decision model specifies a fixed set of alternatives A, a variable population, and a fixed ...
We introduce a new class of rules for resolving quasilinear social choice problems. These rules exte...
In economies with public goods, and agents with quasi-linear preferences, we give a characterization...
We introduce a new class of rules for resolving quasilinear social choice problems. These rules ext...
We review the theory of fairness as it pertains to concretely specified problems of resource allocat...
In economies with public goods, and agents with quasi-linear preferences, we give a characterization...
In his classic monograph, Social Choice and Individual Values, Arrow introduced the notion of a deci...
This paper presents an axiomatic characterization of a family of solutions to two-player quasi-linea...
Several situations of conflict between basic social principles can crop up during a consensus search...
Abstract We introduce the concept of the consensus functional equation, for a bi-variate map defined...
In 1985 Aumann axiomatized the Shapley NTU value by non-emptiness, efficiency, unanimity, scale cova...
A quasi-linear social choice problem is defined as selecting one (among finitely many) indivisible p...
We consider the class of binary social choice problems. A society must choose one of two public proj...
A binary choice problem with side-payments and quasi-linear utilities is considered. We study two co...
A binary choice problem with side-payments and quasi-linear utilities is considered. We study two co...
A public decision model specifies a fixed set of alternatives A, a variable population, and a fixed ...
We introduce a new class of rules for resolving quasilinear social choice problems. These rules exte...
In economies with public goods, and agents with quasi-linear preferences, we give a characterization...
We introduce a new class of rules for resolving quasilinear social choice problems. These rules ext...
We review the theory of fairness as it pertains to concretely specified problems of resource allocat...
In economies with public goods, and agents with quasi-linear preferences, we give a characterization...
In his classic monograph, Social Choice and Individual Values, Arrow introduced the notion of a deci...
This paper presents an axiomatic characterization of a family of solutions to two-player quasi-linea...
Several situations of conflict between basic social principles can crop up during a consensus search...
Abstract We introduce the concept of the consensus functional equation, for a bi-variate map defined...
In 1985 Aumann axiomatized the Shapley NTU value by non-emptiness, efficiency, unanimity, scale cova...