We give a characterization of the set of group-strategyproof, Pareto-optimal, and reallocation-proof allocation rules for the assignment problem, where individuals are assigned at most one indivisible object, without any medium of exchange. Although there are no property rights in the model, the rules satisfying the above criteria imitate a trading procedure with individual endowments, in which individuals exchange objects from their hierarchically determined endowment sets in an iterative manner. In particular, these assignment rules generalize Gale’s top trading cycle procedure, the classical rule for the model in which each individual owns an indivisible good
We study markets with indivisible goods where monetary compensations are not possible. Each individu...
Which strategy-proof nonbossy mechanisms exist in a model with a finite number of indivisible goods ...
We consider a problem of allocating indivisible objects when agents may desire to consume more than ...
We consider assignment problems where individuals are to be assigned at most one indivisible object ...
We consider assignment problems where heterogeneous indivisible goods are to be assigned to individu...
We consider the allocation problem of a single indivisible object to one of several agents under the...
A version of the Second Fundamental Theorem of Welfare Economics that applies to a money-free enviro...
We consider the allocation of heterogeneous indivisible objects without using monetary transfers. Ea...
We consider the allocation of heterogeneous indivisible objects without using monetary transfers. Ea...
The allocation and exchange of discrete resources, such as transplant organs, public housing, dormit...
We consider the problem of allocating several types of indivisible goods when preferences are separa...
This dissertation studies the problem of allocating heterogeneous indivisible goods to agents withou...
We consider exchange markets with heterogeneous indivisible goods. We are interested in exchange rul...
This paper investigates an allocation rule that fairly assigns at most one indivisible object and a ...
This paper investigates an allocation rule that fairly assigns at most one indivisible object and a ...
We study markets with indivisible goods where monetary compensations are not possible. Each individu...
Which strategy-proof nonbossy mechanisms exist in a model with a finite number of indivisible goods ...
We consider a problem of allocating indivisible objects when agents may desire to consume more than ...
We consider assignment problems where individuals are to be assigned at most one indivisible object ...
We consider assignment problems where heterogeneous indivisible goods are to be assigned to individu...
We consider the allocation problem of a single indivisible object to one of several agents under the...
A version of the Second Fundamental Theorem of Welfare Economics that applies to a money-free enviro...
We consider the allocation of heterogeneous indivisible objects without using monetary transfers. Ea...
We consider the allocation of heterogeneous indivisible objects without using monetary transfers. Ea...
The allocation and exchange of discrete resources, such as transplant organs, public housing, dormit...
We consider the problem of allocating several types of indivisible goods when preferences are separa...
This dissertation studies the problem of allocating heterogeneous indivisible goods to agents withou...
We consider exchange markets with heterogeneous indivisible goods. We are interested in exchange rul...
This paper investigates an allocation rule that fairly assigns at most one indivisible object and a ...
This paper investigates an allocation rule that fairly assigns at most one indivisible object and a ...
We study markets with indivisible goods where monetary compensations are not possible. Each individu...
Which strategy-proof nonbossy mechanisms exist in a model with a finite number of indivisible goods ...
We consider a problem of allocating indivisible objects when agents may desire to consume more than ...