AbstractThis paper considers matching problems with individual/regional minimum/maximum quotas. Although such quotas are relevant in many real-world settings, there is a lack of strategyproof mechanisms that take such quotas into account. We first show that without any restrictions on the regional structure, checking the existence of a feasible matching that satisfies all quotas is NP-complete. Then, assuming that regions have a hierarchical structure (i.e., a tree), we show that checking the existence of a feasible matching can be done in time linear in the number of regions. We develop two strategyproof matching mechanisms based on the Deferred Acceptance mechanism (DA), which we call Priority List based Deferred Acceptance with Regional ...
Mechanism design without money has a rich history in social choice literature. Due to the strong imp...
© 2017 Dr. David DelacretazThe present thesis studies mechanism design and matching models where age...
of the New York City (NYC) High School match involved tradeoffs between incentives and efficiency, b...
This paper considers matching problems with individual/regional minimum/maximum quotas. Although suc...
We study matching markets in which institutions may have minimum (in addition to the more standard m...
We introduce a new type of distributional constraints called ratio constraints, which explicitly spe...
© 2018 Elsevier Inc. In matching problems with minimum and maximum type-specific quotas, there may n...
In this paper, we consider two-sided, many-to-one matching problems where agents in one side of the ...
We develop a model of many-to-one matching markets in which agents with multiunit demand aim to maxi...
Distributional constraints are important in many market design settings. Prominent examples include ...
AbstractWe investigate models of two-sided matching markets without transfers. Examples of such mark...
We consider two-sided matching problems where agents on one side of the market (hospitals) are requi...
The Random Order Mechanism (ROM) can be thought of as a sequential version of Gale and Shapley’s def...
Applications such as employees sharing office spaces over a workweek can be modeled as problems wher...
AbstractWe introduce a constrained priority mechanism that combines outcome-based matching from mach...
Mechanism design without money has a rich history in social choice literature. Due to the strong imp...
© 2017 Dr. David DelacretazThe present thesis studies mechanism design and matching models where age...
of the New York City (NYC) High School match involved tradeoffs between incentives and efficiency, b...
This paper considers matching problems with individual/regional minimum/maximum quotas. Although suc...
We study matching markets in which institutions may have minimum (in addition to the more standard m...
We introduce a new type of distributional constraints called ratio constraints, which explicitly spe...
© 2018 Elsevier Inc. In matching problems with minimum and maximum type-specific quotas, there may n...
In this paper, we consider two-sided, many-to-one matching problems where agents in one side of the ...
We develop a model of many-to-one matching markets in which agents with multiunit demand aim to maxi...
Distributional constraints are important in many market design settings. Prominent examples include ...
AbstractWe investigate models of two-sided matching markets without transfers. Examples of such mark...
We consider two-sided matching problems where agents on one side of the market (hospitals) are requi...
The Random Order Mechanism (ROM) can be thought of as a sequential version of Gale and Shapley’s def...
Applications such as employees sharing office spaces over a workweek can be modeled as problems wher...
AbstractWe introduce a constrained priority mechanism that combines outcome-based matching from mach...
Mechanism design without money has a rich history in social choice literature. Due to the strong imp...
© 2017 Dr. David DelacretazThe present thesis studies mechanism design and matching models where age...
of the New York City (NYC) High School match involved tradeoffs between incentives and efficiency, b...