We introduce a new class of rules for resolving quasilinear social choice problems. These rules extend those of Green. We call such rules multi-utilitarian rules. Each multi-utilitarian rule is associated with a probability measure over the set of weighted utilitarian rules, and is derived as the expectation of this probability. These rules are characterized by the axioms efficiency, translation invariance, monotonicity, continuity, and additivity. By adding recursive invariance, we obtain a class of asymmetric rules generalizing those Green characterizes. A multi-utilitarian rule satisfying strong monotonicity has an associated probability measure with full support
We model social choices as acts mapping states of the world to (social) outcomes. A (social choice) ...
We reconsider the problem of aggregating individual preference orderings into a single social orderi...
A quasi-linear social choice problem is defined as selecting one (among finitely many) indivisible p...
We introduce a new class of rules for resolving quasilinear social choice problems. These rules exte...
We introduce a new class of rules for resolving quasilinear social choice problems. These rules ext...
We consider the class of binary social choice problems. A society must choose one of two public proj...
This paper presents an axiomatic characterization of a family of solutions to two-player quasi-linea...
A quasi-linear social choice problem is concerned with choosing one among a finite set of public pro...
This paper introduces the 'Extended Pareto' axiom on Social welfare functions and gives a characteri...
In a setting where agents have quasi-linear utilities over social alternatives and a transferable co...
We explore the conditions under which behavior in a strategic setting can be rationalized as the bes...
The theory of social choice introduced in [5,6] is robust; it is completely independent of the choic...
This paper introduces the 'Extended Pareto' axiom on Social welfare functions and gives a characteri...
In a unified framework of allocation problems with at least three en-tities (or agents), we show tha...
We describe the class of strategy-proof mechanisms for choosing sets of objects when preferences are...
We model social choices as acts mapping states of the world to (social) outcomes. A (social choice) ...
We reconsider the problem of aggregating individual preference orderings into a single social orderi...
A quasi-linear social choice problem is defined as selecting one (among finitely many) indivisible p...
We introduce a new class of rules for resolving quasilinear social choice problems. These rules exte...
We introduce a new class of rules for resolving quasilinear social choice problems. These rules ext...
We consider the class of binary social choice problems. A society must choose one of two public proj...
This paper presents an axiomatic characterization of a family of solutions to two-player quasi-linea...
A quasi-linear social choice problem is concerned with choosing one among a finite set of public pro...
This paper introduces the 'Extended Pareto' axiom on Social welfare functions and gives a characteri...
In a setting where agents have quasi-linear utilities over social alternatives and a transferable co...
We explore the conditions under which behavior in a strategic setting can be rationalized as the bes...
The theory of social choice introduced in [5,6] is robust; it is completely independent of the choic...
This paper introduces the 'Extended Pareto' axiom on Social welfare functions and gives a characteri...
In a unified framework of allocation problems with at least three en-tities (or agents), we show tha...
We describe the class of strategy-proof mechanisms for choosing sets of objects when preferences are...
We model social choices as acts mapping states of the world to (social) outcomes. A (social choice) ...
We reconsider the problem of aggregating individual preference orderings into a single social orderi...
A quasi-linear social choice problem is defined as selecting one (among finitely many) indivisible p...