We consider the problem of alloting shares of a task or good among agents with single peaked preferences over their own shares. Previous characterizations have examined rules, such as the uniform rule, which satisfy various symmetry requirements. We consider the case where agents might begin with natural claims to minimal or maximal allotments, or might be treated with different priorities. We provide characterizations of the rules which are strategy-proof and efficient, but may treat individuals asymmetrically.
We consider strategy-proof rules operating on a rich domain of preference profiles in a set up where...
An allocation rule is securely implementable if it is strategy-proof and has no "bad" Nash equilibri...
We consider the problems of allocating objects to a group of agents and how much agents should pay. ...
The division problem consists of allocating an amount of a perfectly divisible good among a group of...
For the division problem with single-peaked preferences (Sprumont, 1991) we show that all sequential...
We consider the problem of allocating m commodities among n agents with single-peaked preferences. W...
We consider the problem of (re)allocating the total endowment of an in-¯nitely divisible commodity a...
Abstract This paper considers the problem of allocating multiple divisible commodities among a group...
We consider the problem of allocating multiple social endowments (estates) of a perfectly divisible ...
The division problem consists of allocating an amount of a perfectly divisible good among a group of...
We consider the problem of allocating multiple social endowments (estates) of a perfectly divisible ...
We consider private good economies with single-plateaued preferences. A solution selects for each pr...
We consider the problem of allocating a single object to the agents with payments. Agents have prefe...
We consider the problem of (re)allocating the total endowment of an infinitely divisible commodity a...
We consider a problem of allocating infinitely divisible commodities among a group of agents. More s...
We consider strategy-proof rules operating on a rich domain of preference profiles in a set up where...
An allocation rule is securely implementable if it is strategy-proof and has no "bad" Nash equilibri...
We consider the problems of allocating objects to a group of agents and how much agents should pay. ...
The division problem consists of allocating an amount of a perfectly divisible good among a group of...
For the division problem with single-peaked preferences (Sprumont, 1991) we show that all sequential...
We consider the problem of allocating m commodities among n agents with single-peaked preferences. W...
We consider the problem of (re)allocating the total endowment of an in-¯nitely divisible commodity a...
Abstract This paper considers the problem of allocating multiple divisible commodities among a group...
We consider the problem of allocating multiple social endowments (estates) of a perfectly divisible ...
The division problem consists of allocating an amount of a perfectly divisible good among a group of...
We consider the problem of allocating multiple social endowments (estates) of a perfectly divisible ...
We consider private good economies with single-plateaued preferences. A solution selects for each pr...
We consider the problem of allocating a single object to the agents with payments. Agents have prefe...
We consider the problem of (re)allocating the total endowment of an infinitely divisible commodity a...
We consider a problem of allocating infinitely divisible commodities among a group of agents. More s...
We consider strategy-proof rules operating on a rich domain of preference profiles in a set up where...
An allocation rule is securely implementable if it is strategy-proof and has no "bad" Nash equilibri...
We consider the problems of allocating objects to a group of agents and how much agents should pay. ...