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dc.contributor.authorDzemski, Andreas
dc.contributor.authorOkui, Ryo
dc.date.accessioned2018-03-06T15:16:38Z
dc.date.available2018-03-06T15:16:38Z
dc.date.issued2018-03
dc.identifier.issn1403-2465
dc.identifier.urihttp://hdl.handle.net/2077/55922
dc.descriptionJEL: C23, C33, C38sv
dc.description.abstractWe develop new procedures to quantify the statistical uncertainty from sorting units in panel data into groups using data-driven clustering algorithms. In our setting, each unit belongs to one of a finite number of latent groups and its regression curve is determined by which group it belongs to. Our main contribution is a new joint confidence set for group membership. Each element of the joint confidence set is a vector of possible group assignments for all units. The vector of true group memberships is contained in the confidence set with a pre-specified probability. The confidence set inverts a test for group membership. This test exploits a characterization of the true group memberships by a system of moment inequalities. Our procedure solves a high-dimensional one-sided testing problem and tests group membership simultaneously for all units. We also propose a procedure for identifying units for which group membership is obviously determined. These units can be ignored when computing critical values. We justify the joint confidence set under N, T → ∞ asymptotics where we allow T to be much smaller than N. Our arguments rely on the theory of self-normalized sums and high-dimensional central limit theorems. We contribute new theoretical results for testing problems with a large number of moment inequalities, including an anti-concentration inequality for the quasi-likelihood ratio (QLR) statistic. Monte Carlo results indicate that our confidence set has adequate coverage and is informative. We illustrate the practical relevance of our confidence set in two applications.sv
dc.format.extent85sv
dc.language.isoengsv
dc.relation.ispartofseriesWorking Papers in Economicssv
dc.relation.ispartofseries727sv
dc.subjectPanel datasv
dc.subjectgrouped heterogeneitysv
dc.subjectclusteringsv
dc.subjectconfidence setsv
dc.subjectmachine learningsv
dc.subjectmoment inequalitiessv
dc.subjectjoint one-sided testssv
dc.subjectself-normalized sumssv
dc.subjecthigh-dimensional CLTsv
dc.subjectanti-concentration for QLRsv
dc.titleConfidence Set for Group Membershipsv
dc.typeTextsv
dc.type.svepreportsv
dc.contributor.organizationDept. of Economics, University of Gothenburgsv


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