We study the House Allocation problem (also known as the Assignment problem), i.e., the problem of allocating a set of objects among a set of agents, where each agent has ordinal preferences (possibly involving ties) over a subset of the objects. We focus on truthful mechanisms without monetary transfers for finding large Pareto optimal matchings. It is straightforward to show that no deterministic truthful mechanism can approximate a maximum cardinality Pareto optimal matching with ratio better than 2. We thus consider randomized mechanisms. We give a natural and explicit extension of the classical Random Serial Dictatorship Mechanism (RSDM) specifically for the House Allocation problem where preference lists can include ties. We thus obta...
Is the Pareto optimality of matching mechanisms robust to the introduction of boundedly rational beh...
In unit-demand and multi-copy object allocation problems, we say that a mechanism size-wise dominat...
Inspired by real-world applications such as the assignment of pupils to schools or the allocation of...
We study the House Allocation problem (also known as the Assignment problem),i.e., the problem of al...
We study the House Allocation problem (also known as the Assignment problem), i.e., the problem of a...
We study the House Allocation problem (also known as the Assignment problem), i.e., the problem of a...
We study Pareto optimal matchings in the context of house allocation problems. We present an O(\sqrt...
When not all objects are acceptable to all agents, maximizing the number of objects actually assign...
Classical online bipartite matching problem and its generalizations are central algorithmic optimiza...
Abstract The study of matching problems typically assumes that agents precisely know their preferenc...
We study random assignment of indivisible objects among a set of agents with strict preferences. Ra...
This dissertation studies the problem of allocating heterogeneous indivisible goods to agents withou...
We study discrete resource allocation problems in which agents have unit demand and strict preferenc...
This paper considers the problem of allocating N indivisible objects among N agents according to the...
Abstract. In the random assignment problem, the probabilistic serial mechanism (Bo-gomolnaia and Mou...
Is the Pareto optimality of matching mechanisms robust to the introduction of boundedly rational beh...
In unit-demand and multi-copy object allocation problems, we say that a mechanism size-wise dominat...
Inspired by real-world applications such as the assignment of pupils to schools or the allocation of...
We study the House Allocation problem (also known as the Assignment problem),i.e., the problem of al...
We study the House Allocation problem (also known as the Assignment problem), i.e., the problem of a...
We study the House Allocation problem (also known as the Assignment problem), i.e., the problem of a...
We study Pareto optimal matchings in the context of house allocation problems. We present an O(\sqrt...
When not all objects are acceptable to all agents, maximizing the number of objects actually assign...
Classical online bipartite matching problem and its generalizations are central algorithmic optimiza...
Abstract The study of matching problems typically assumes that agents precisely know their preferenc...
We study random assignment of indivisible objects among a set of agents with strict preferences. Ra...
This dissertation studies the problem of allocating heterogeneous indivisible goods to agents withou...
We study discrete resource allocation problems in which agents have unit demand and strict preferenc...
This paper considers the problem of allocating N indivisible objects among N agents according to the...
Abstract. In the random assignment problem, the probabilistic serial mechanism (Bo-gomolnaia and Mou...
Is the Pareto optimality of matching mechanisms robust to the introduction of boundedly rational beh...
In unit-demand and multi-copy object allocation problems, we say that a mechanism size-wise dominat...
Inspired by real-world applications such as the assignment of pupils to schools or the allocation of...