We study hybrid online-batch matching problems, where agents arrive continuously, but are only matched in periodic rounds, when many of them can be considered simultaneously. Agents not getting matched in a given round remain in the market for the next round. This setting models several scenarios of interest, including many job markets as well as kidney exchange mechanisms. We consider the social utility of two commonly used mechanisms for such markets: one that aims for stability in each round (greedy), and one that attempts to maximize social utility in each round (max-weight). Surprisingly, we find that in the long term, the social utility of the greedy mechanism can be higher than that of the max-weight mechanism. We hypothesiz...
Multi-agent algorithms inspired by the division of labour in social insects are applied to a problem...
We study the problem of approximate social welfare maximization (without money) in one-sided matchin...
Preliminary and incomplete. We study efficient and stable mechanisms in matching markets when the nu...
Abstract. We consider the loss in social welfare caused by individual rationality in matching scenar...
In this dissertation, I study the properties of and propose the use of a family of random mechanisms...
We study mediated many-to-many matching in dynamic two-sided markets in which agents private valuati...
This electronic version was submitted by the student author. The certified thesis is available in th...
Mechanism design without money has a rich history in social choice literature. Due to the strong imp...
We study social welfare of learning outcomes in mechanisms with admission. In our repeated game ther...
We consider the problem of efficient operation of a barter exchange platform for indivisible goods. ...
We study the problem of allocating a single item repeatedly among multiple competing agents, in an e...
We study a mechanism design version of matching computation in graphs that models the game played by...
We consider dynamic auction mechanisms for the allocation of multiple items. Items are identical, bu...
We study the Price of Anarchy of mechanisms for the well-known problem of one-sided matching, or hou...
Kidney exchange pools are currently thin and sparse consisting of many highly sensitized patients. O...
Multi-agent algorithms inspired by the division of labour in social insects are applied to a problem...
We study the problem of approximate social welfare maximization (without money) in one-sided matchin...
Preliminary and incomplete. We study efficient and stable mechanisms in matching markets when the nu...
Abstract. We consider the loss in social welfare caused by individual rationality in matching scenar...
In this dissertation, I study the properties of and propose the use of a family of random mechanisms...
We study mediated many-to-many matching in dynamic two-sided markets in which agents private valuati...
This electronic version was submitted by the student author. The certified thesis is available in th...
Mechanism design without money has a rich history in social choice literature. Due to the strong imp...
We study social welfare of learning outcomes in mechanisms with admission. In our repeated game ther...
We consider the problem of efficient operation of a barter exchange platform for indivisible goods. ...
We study the problem of allocating a single item repeatedly among multiple competing agents, in an e...
We study a mechanism design version of matching computation in graphs that models the game played by...
We consider dynamic auction mechanisms for the allocation of multiple items. Items are identical, bu...
We study the Price of Anarchy of mechanisms for the well-known problem of one-sided matching, or hou...
Kidney exchange pools are currently thin and sparse consisting of many highly sensitized patients. O...
Multi-agent algorithms inspired by the division of labour in social insects are applied to a problem...
We study the problem of approximate social welfare maximization (without money) in one-sided matchin...
Preliminary and incomplete. We study efficient and stable mechanisms in matching markets when the nu...