{"title":"The Core of Housing Markets from an Agent’s Perspective: Is It Worth Sprucing up Your Home?","authors":"Ildikó Schlotter, Péter Biró, Tamás Fleiner","doi":"10.1287/moor.2023.0092","DOIUrl":null,"url":null,"abstract":"We study housing markets as introduced by Shapley and Scarf. We investigate the computational complexity of various questions regarding the situation of an agent a in a housing market H: we show that it is [Formula: see text]-hard to find an allocation in the core of H in which (i) a receives a certain house, (ii) a does not receive a certain house, or (iii) a receives a house other than a’s own. We prove that the core of housing markets respects improvement in the following sense: given an allocation in the core of H in which agent a receives a house h, if the value of the house owned by a increases, then the resulting housing market admits an allocation in its core in which a receives either h or a house that a prefers to h; moreover, such an allocation can be found efficiently. We further show an analogous result in the Stable Roommates setting by proving that stable matchings in a one-sided market also respect improvement.Funding: This work was supported by the Hungarian Scientific Research Fund [Grants K124171, K128611]. I. Schlotter is supported by the Hungarian Academy of Sciences under its Momentum Programme (LP2021-2) and its János Bolyai Research Scholarship. The research reported in this paper and carried out by T. Fleiner at the Budapest University of Technology and Economics was supported by the “TKP2020, National Challenges Program” of the National Research Development and Innovation Office [BME NC TKP2020 and OTKA K143858] and by the Higher Education Excellence Program of the Ministry of Human Capacities in the frame of the Artificial Intelligence research area of the Budapest University of Technology and Economics (BME FIKP-MI/SC). P. Biró gratefully acknowledges financial support from the Hungarian Scientific Research Fund, OTKA [Grant K143858] and the Hungarian Academy of Sciences [Momentum Grant LP2021-2].","PeriodicalId":49852,"journal":{"name":"Mathematics of Operations Research","volume":"5 1","pages":""},"PeriodicalIF":1.4000,"publicationDate":"2024-08-28","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Mathematics of Operations Research","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1287/moor.2023.0092","RegionNum":3,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q2","JCRName":"MATHEMATICS, APPLIED","Score":null,"Total":0}
引用次数: 0
Abstract
We study housing markets as introduced by Shapley and Scarf. We investigate the computational complexity of various questions regarding the situation of an agent a in a housing market H: we show that it is [Formula: see text]-hard to find an allocation in the core of H in which (i) a receives a certain house, (ii) a does not receive a certain house, or (iii) a receives a house other than a’s own. We prove that the core of housing markets respects improvement in the following sense: given an allocation in the core of H in which agent a receives a house h, if the value of the house owned by a increases, then the resulting housing market admits an allocation in its core in which a receives either h or a house that a prefers to h; moreover, such an allocation can be found efficiently. We further show an analogous result in the Stable Roommates setting by proving that stable matchings in a one-sided market also respect improvement.Funding: This work was supported by the Hungarian Scientific Research Fund [Grants K124171, K128611]. I. Schlotter is supported by the Hungarian Academy of Sciences under its Momentum Programme (LP2021-2) and its János Bolyai Research Scholarship. The research reported in this paper and carried out by T. Fleiner at the Budapest University of Technology and Economics was supported by the “TKP2020, National Challenges Program” of the National Research Development and Innovation Office [BME NC TKP2020 and OTKA K143858] and by the Higher Education Excellence Program of the Ministry of Human Capacities in the frame of the Artificial Intelligence research area of the Budapest University of Technology and Economics (BME FIKP-MI/SC). P. Biró gratefully acknowledges financial support from the Hungarian Scientific Research Fund, OTKA [Grant K143858] and the Hungarian Academy of Sciences [Momentum Grant LP2021-2].
我们研究沙普利和斯卡夫提出的住房市场。我们研究了与代理人 a 在住房市场 H 中的处境有关的各种问题的计算复杂性:我们证明,要在 H 的核心中找到一种分配是[公式:见正文]困难的,在这种分配中:(i) a 得到某所房子,(ii) a 没有得到某所房子,或者 (iii) a 得到的房子不是 a 自己的房子。我们证明,住房市场的核心尊重以下意义上的改进:给定 H 核心中的一个分配,其中代理人 a 得到一个房子 h,如果 a 拥有的房子的价值增加,那么由此产生的住房市场在其核心中允许一个分配,其中 a 得到 h 或 a 比 h 更喜欢的房子;此外,这样的分配可以有效地找到。我们进一步证明了单边市场中的稳定匹配也尊重改进,从而在稳定室友设置中展示了类似的结果:本研究得到了匈牙利科学研究基金[Grants K124171, K128611]的支持。I. Schlotter 由匈牙利科学院 Momentum 计划 (LP2021-2) 和 János Bolyai 研究奖学金资助。本文所报道的 T. Fleiner 在布达佩斯技术经济大学进行的研究得到了国家研究发展和创新办公室 "TKP2020,国家挑战计划"[BME NC TKP2020 和 OTKA K143858]以及布达佩斯技术经济大学人工智能研究领域框架内的人力部高等教育卓越计划(BME FIKP-MI/SC)的支持。P. Biró 感谢匈牙利科学研究基金 OTKA [Grant K143858] 和匈牙利科学院 [Momentum Grant LP2021-2] 的资助。
期刊介绍:
Mathematics of Operations Research is an international journal of the Institute for Operations Research and the Management Sciences (INFORMS). The journal invites articles concerned with the mathematical and computational foundations in the areas of continuous, discrete, and stochastic optimization; mathematical programming; dynamic programming; stochastic processes; stochastic models; simulation methodology; control and adaptation; networks; game theory; and decision theory. Also sought are contributions to learning theory and machine learning that have special relevance to decision making, operations research, and management science. The emphasis is on originality, quality, and importance; correctness alone is not sufficient. Significant developments in operations research and management science not having substantial mathematical interest should be directed to other journals such as Management Science or Operations Research.