Designing Matching Mechanisms under General Distributional Constraints

Goto, Masahiro; Kojima, Fuhito; Kurata, Ryoji; Tamura, Akihisa; Yokoo, Makoto

doi:10.1257/mic.20160124

Cited by 32 publications

(12 citation statements)

References 27 publications

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“…Alternatively, Goto, Kojima, Kurata, Tamura, and Yokoo (2016) present a general framework for handling more unrestricted class of constraints (beyond M -concavity) and a class of strategy-proof mechanism that is different from the generalized DA mechanism. Our DA-OT is not an instance of their mechanism; it is an instance of the generalized DA mechanism.…”

Section: Related Literaturementioning

confidence: 99%

Controlled School Choice with Soft Bounds and Overlapping Types

Kurata

Hamada

Iwasaki

et al. 2017

jair

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School choice programs are implemented to give students/parents an opportunity to choose the public school the students attend. Controlled school choice programs need to provide choices for students/parents while maintaining distributional constraints on the composition of students, typically in terms of socioeconomic status. Previous works show that setting soft-bounds, which flexibly change the priorities of students based on their types, is more appropriate than setting hard-bounds, which strictly limit the number of accepted students for each type. We consider a case where soft-bounds are imposed and one student can belong to multiple types, e.g., "financially-distressed" and "minority" types. We first show that when we apply a model that is a straightforward extension of an existing model for disjoint types, there is a chance that no stable matching exists. Thus we propose an alternative model and an alternative stability definition, where a school has reserved seats for each type. We show that a stable matching is guaranteed to exist in this model and develop a mechanism called Deferred Acceptance for Overlapping Types (DA-OT). The DA-OT mechanism is strategy-proof and obtains the student-optimal matching within all stable matchings. Furthermore, we introduce an extended model that can handle both type-specific ceilings and floors and propose a extended mechanism DA-OT * to handle the extended model. Computer simulation results illustrate that DA-OT outperforms an artificial cap mechanism where we set a hard-bound for each type in each school. DA-OT * can achieve stability in the extended model without sacrificing students' welfare.

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Section: Related Literaturementioning

confidence: 99%

Controlled School Choice with Soft Bounds and Overlapping Types

Kurata

Hamada

Iwasaki

et al. 2017

jair

Self Cite

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“…[39]). Strategy-proofness can also be satisfied by modified variants of the deferred-acceptance mechanism for the case of lower quotas, as suggested also for the Japanese resident allocations [28,29,25]. However, if we allow ties and we consider goals such as rank-minimisation then our mechanism becomes manipulable.…”

Section: Discussion Further Questionsmentioning

confidence: 96%

“…Distributional constraints are present in many two-sided matching markets. In the Japanese resident allocation the government wants to ensure that the doctors are evenly distributed across the country, and to achieve this they imposed lower quotas on the number of doctors allocated in each region [28,29,25]. Distributional objectives can also appear in school choice programs, where the decision makers want to control the socio-ethnical distribution of the students [2,15,20,21].…”

Section: Introductionmentioning

confidence: 99%

Stable project allocation under distributional constraints

Ágoston

Bíró

Szántó

2018

Operations Research Perspectives

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In a two-sided matching market when agents on both sides have preferences the stability of the solution is typically the most important requirement. However, we may also face some distributional constraints with regard to the minimum number of assignees or the distribution of the assignees according to their types. These two requirements can be challenging to reconcile in practice. In this paper we describe two real applications, a project allocation problem and a workshop assignment problem, both involving some distributional constraints. We used integer programming techniques to find reasonably good solutions with regard to the stability and the distributional constraints. Our approach can be useful in a variety of different applications, such as resident allocation with lower quotas, controlled school choice or college admissions with affirmative action.

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“…We now present an axiom that avoids scenarios where a candidate may feel that she deserves the place of a lesser ranked candidate. The axiom is adapted from the literature on stable matching with distributional constraints Goto et al, 2017;Kojima et al, 2014;Ehlers et al, 2014;Kamada and Kojima, 2015).…”

Section: Axioms For Diverse Committee Selectionmentioning

confidence: 99%

A Rule for Committee Selection with Soft Diversity Constraints

Aziz

2019

Group Decis Negot

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Committee selection with diversity or distributional constraints is a ubiquitous problem. However, many of the formal approaches proposed so far have certain drawbacks including (1) computationally intractability in general, and (2) inability to suggest a solution for certain instances where the hard constraints cannot be met. We propose a practical and polynomial-time algorithm for diverse committee selection that draws on the idea of using soft bounds and satisfies natural axioms.

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Designing Matching Mechanisms under General Distributional Constraints

Cited by 32 publications

References 27 publications

Controlled School Choice with Soft Bounds and Overlapping Types

Controlled School Choice with Soft Bounds and Overlapping Types

Stable project allocation under distributional constraints

A Rule for Committee Selection with Soft Diversity Constraints

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