We consider the problem of allocating a finite number of divisible homogeneous goods to N ≥ 2 individuals, in a way which is both envy-free and Pareto optimal. Building on Thomson (2005 Games and Economic Behavior), a new simple mechanism is presented here with the following properties: a) the mechanism fully implements the desired divisions, i.e. for each preference profile the set of equilibrium outcomes coincides with the set of fair divisions; b) the set of equilibria is a global attractor for the best-reply dynamics. Thus, players myopically adapting their strategies settle down in an fair division. The result holds even if mixed strategies are used
In finite games, mixed Nash equilibria always exist, but pure equilibria may fail to exist. To asses...
We study the problem of fair division of a heterogeneous resource among strategic players. Given a d...
We revisit the classic problem of fair division from a mechanism design perspective, using Proportio...
We consider a fair division setting in which items arrive one by one and are allocated to agents via...
The problem of dividing resources fairly occurs in many practical situations and is therefore an imp...
International audienceIn this article, we study the problem of Nash implementation in private good e...
Fair division, a key concern in the design of many social institutions, has for 70 years been the su...
The fair division of indivisible goods has long been an important topic in economics and, more recen...
Two or more players rank a set of indivisible items from best to worst. An efficient allocation of i...
We consider the problem of fairly allocating a set of indivisible goods to a set of strategic agents...
We study the paradigmatic fair division problem of fairly allocating a divisible good among agents w...
We study a fair division problem with indivisible objects like jobs, houses, and one divisible good ...
Haake C-J, Raith MG, Su FE. Bidding for envy-freeness: A procedural approach to n-player fair-divisi...
We consider the problem of fairly dividing a collection of indivisible goods among a set of players....
We consider the allocation of a finite number of homogeneous divisible items among three players. Un...
In finite games, mixed Nash equilibria always exist, but pure equilibria may fail to exist. To asses...
We study the problem of fair division of a heterogeneous resource among strategic players. Given a d...
We revisit the classic problem of fair division from a mechanism design perspective, using Proportio...
We consider a fair division setting in which items arrive one by one and are allocated to agents via...
The problem of dividing resources fairly occurs in many practical situations and is therefore an imp...
International audienceIn this article, we study the problem of Nash implementation in private good e...
Fair division, a key concern in the design of many social institutions, has for 70 years been the su...
The fair division of indivisible goods has long been an important topic in economics and, more recen...
Two or more players rank a set of indivisible items from best to worst. An efficient allocation of i...
We consider the problem of fairly allocating a set of indivisible goods to a set of strategic agents...
We study the paradigmatic fair division problem of fairly allocating a divisible good among agents w...
We study a fair division problem with indivisible objects like jobs, houses, and one divisible good ...
Haake C-J, Raith MG, Su FE. Bidding for envy-freeness: A procedural approach to n-player fair-divisi...
We consider the problem of fairly dividing a collection of indivisible goods among a set of players....
We consider the allocation of a finite number of homogeneous divisible items among three players. Un...
In finite games, mixed Nash equilibria always exist, but pure equilibria may fail to exist. To asses...
We study the problem of fair division of a heterogeneous resource among strategic players. Given a d...
We revisit the classic problem of fair division from a mechanism design perspective, using Proportio...