We study the problem of approximate social welfare maximization (without money) in one-sided matching problems when agents have unrestricted cardinal preferences over a finite set of items. Random priority is a very well-known truthful-in-expectation mechanism for the problem. We prove that the approximation ratio of random priority is O(n -1/2) while no truthful-in-expectation mechanism can achieve an approximation ratio better than O(n -1/2), where n is the number of agents and items. Furthermore, we prove that the approximation ratio of all ordinal (not necessarily truthful-in-expectation) mechanisms is upper bounded by O(n -1/2), indicating that random priority is asymptotically the best truthful-in-expectation mechanism and the best or...
We study the House Allocation problem (also known as the Assignment problem), i.e., the problem of a...
In the stable matching problem, given a two-sided matching market where each agent has ordinal prefe...
We consider the one-sided matching problem, where n agents have preferences over n items, and these ...
We study the problem of approximate social welfare maximization (without money) in onesided matching...
We consider the fundamental mechanism design problem of approximate social welfare maximization unde...
We study the Price of Anarchy of mechanisms for the well-known problem of one-sided matching, or hou...
We study the Price of Anarchy of mechanisms for the wellknown problem of one-sided matching, or hous...
A mechanism for the random assignment problem takes agents' private preferences over items as input ...
We study the Price of Anarchy of mechanisms for the well-known problem of one-sided matching, or hou...
We study social welfare in one-sided matching markets where the goal is to efficiently allocate n it...
We continue the study of welfare maximization in unit-demand (matching) markets, in a distributed in...
The approximation ratio has become one of the dominant measures in mechanism design problems. In lig...
In this dissertation, I study the properties of and propose the use of a family of random mechanisms...
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 the House Allocation problem (also known as the Assignment problem), i.e., the problem of a...
In the stable matching problem, given a two-sided matching market where each agent has ordinal prefe...
We consider the one-sided matching problem, where n agents have preferences over n items, and these ...
We study the problem of approximate social welfare maximization (without money) in onesided matching...
We consider the fundamental mechanism design problem of approximate social welfare maximization unde...
We study the Price of Anarchy of mechanisms for the well-known problem of one-sided matching, or hou...
We study the Price of Anarchy of mechanisms for the wellknown problem of one-sided matching, or hous...
A mechanism for the random assignment problem takes agents' private preferences over items as input ...
We study the Price of Anarchy of mechanisms for the well-known problem of one-sided matching, or hou...
We study social welfare in one-sided matching markets where the goal is to efficiently allocate n it...
We continue the study of welfare maximization in unit-demand (matching) markets, in a distributed in...
The approximation ratio has become one of the dominant measures in mechanism design problems. In lig...
In this dissertation, I study the properties of and propose the use of a family of random mechanisms...
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 the House Allocation problem (also known as the Assignment problem), i.e., the problem of a...
In the stable matching problem, given a two-sided matching market where each agent has ordinal prefe...
We consider the one-sided matching problem, where n agents have preferences over n items, and these ...