A social choice function may or may not satisfy a desirable property depending on its domain of definition. For the same reason, different conditions may be equivalent for functions defined on some domains, while different in other cases. Understanding the role of domains is therefore a crucial issue in mechanism design. We illustrate this point by analyzing the role of different conditions that are always related, but not always equivalent to strategy-proofness. We de ne two very natural conditions that are necessary for strategy-proofness: monotonicity and reshu ing invariance. We remark that they are not always sufficient. Then, we identify a domain condition, called intertwinedness, that ensures the equivalence between our two conditio...
We consider strategy-proof social choice functions operating on a rich domain of preference profiles...
The Muller-Satterthwaite Theorem (J Econ Theory 14:412-418, 1977) establishes the equivalence betwee...
We generalize the traditional concept of single-peaked preference domains in two ways. First, we int...
A social choice function may or may not satisfy a desirable property depending on its domain of defi...
A social choice function may or may not satisfy a desirable property depending on its domain of defi...
Abstract: A social choice function is group strategy-proof on a domain if no group of agents can man...
Group strategy-proofness is a very attractive requirement of incentive compatibility. But in many ca...
The Muller-Satterthwaite Theorem (J Econ Theory 14:412-418, 1977) establishes the equivalence betwee...
We study strategy-proof rules for choosing between two alternatives. We consider the full preference...
We consider strategy-proof rules operating on a rich domain of preference profiles in a set up where...
We show, with an example, that the theorem on the characterization of domains admitting strategy-pro...
A social choice function is group strategy-proof on a domain if no group of agents can manipulate it...
In this paper we establish the link between strategy-proofness and unanimity in a domain of private ...
Abstract: We consider strategy-proof social choice functions operating on a rich do-main of preferen...
In this paper, we introduce a sufficient condition on the domain of admissible preferences of a soci...
We consider strategy-proof social choice functions operating on a rich domain of preference profiles...
The Muller-Satterthwaite Theorem (J Econ Theory 14:412-418, 1977) establishes the equivalence betwee...
We generalize the traditional concept of single-peaked preference domains in two ways. First, we int...
A social choice function may or may not satisfy a desirable property depending on its domain of defi...
A social choice function may or may not satisfy a desirable property depending on its domain of defi...
Abstract: A social choice function is group strategy-proof on a domain if no group of agents can man...
Group strategy-proofness is a very attractive requirement of incentive compatibility. But in many ca...
The Muller-Satterthwaite Theorem (J Econ Theory 14:412-418, 1977) establishes the equivalence betwee...
We study strategy-proof rules for choosing between two alternatives. We consider the full preference...
We consider strategy-proof rules operating on a rich domain of preference profiles in a set up where...
We show, with an example, that the theorem on the characterization of domains admitting strategy-pro...
A social choice function is group strategy-proof on a domain if no group of agents can manipulate it...
In this paper we establish the link between strategy-proofness and unanimity in a domain of private ...
Abstract: We consider strategy-proof social choice functions operating on a rich do-main of preferen...
In this paper, we introduce a sufficient condition on the domain of admissible preferences of a soci...
We consider strategy-proof social choice functions operating on a rich domain of preference profiles...
The Muller-Satterthwaite Theorem (J Econ Theory 14:412-418, 1977) establishes the equivalence betwee...
We generalize the traditional concept of single-peaked preference domains in two ways. First, we int...