Inference on Regressions with Interval Data on a Regressor or Outcome

Manski, Charles F.; Tamer, Elie

doi:10.1111/1468-0262.00294

Cited by 358 publications

(426 citation statements)

References 11 publications

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“…Manski (2003Manski ( , 2007, and Horowitz and Manski (1995) note that data errors or data modifications pose identification problems and generally result in only set identification of the parameter of interest. Manski and Tamer (2002) and Magnac and Maurin (2008) give examples where-for confidentiality or anonymity reasons-the data may be transformed into interval data or some attributes may be suppressed, leading to the loss of point identification of the parameters of interest. Consideration of the general setup in Molinari (2008) allows one to assess the impact of some data anonymization as a general misclassification problem.…”

Section: Related Literaturementioning

confidence: 99%

Identification, Data Combination and the Risk of Disclosure

2014

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It is commonplace that the data needed for econometric inference are not contained in a single source. In this paper we analyze the problem of parametric inference from combined individual-level data when data combination is based on personal and demographic identifiers such as name, age, or address. Our main question is the identification of the econometric model based on the combined data when the data do not contain exact individual identifiers and no parametric assumptions are imposed on the joint distribution of information that is common across the combined data set. We demonstrate the conditions on the observable marginal distributions of data in individual data sets that can and cannot guarantee identification of the parameters of interest. We also note that the data combination procedure is essential in a semiparametric setting such as ours. Provided that the (nonparametric) data combination procedure can only be defined in finite samples, we introduce a new notion of identification based on the concept of limits of statistical experiments. Our results apply to the setting where the individual data used for inferences are sensitive and their combination may lead to a substantial increase in the data sensitivity or lead to a "de-anonymization" of the previously "anonymized" information. We demonstrate that the point identification of an econometric model from combined data is incompatible with restrictions on the risk of individual disclosure. If the data combination procedure guarantees a bound on the risk of individual disclosure, then the information available from the combined data set allows one to identify the parameter of interest only partially, and the size of the identification region is inversely related to the upper bound guarantee for the disclosure risk. This result is new in the context of data combination as we notice that the quality of links that need to be used in the combined data to assure point identification may be much higher than the average link quality in the entire data set, and thus point inference requires the use of the 396 Komarova, Nekipelov, and Yakovlev Quantitative Economics 9 (2018) most sensitive subset of the data. Our results provide important insights into the ongoing discourse on the empirical analysis of merged administrative records as well as discussions on the "disclosive" nature of policies implemented by the datadriven companies (such as internet services companies and medical companies using individual patient records for policy decisions).

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Section: Related Literaturementioning

confidence: 99%

Identification, Data Combination and the Risk of Disclosure

2014

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“…In this paper, we provide a complementary approach based on tools of random sets theory. We characterize I avoiding altogether the need to deal with ; thereby contributing to a stream of previous literature which has provided tractable characterizations of sharp identi…cation regions without making any reference to the selection mechanism or the selected prediction (see, e.g., Manski (2003) and Manski and Tamer (2002)). …”

Section: Assumption 24 (Selected Prediction)mentioning

confidence: 99%

“…Examples of sharp identi…cation regions for parameters of incomplete models are given in Manski (1989Manski ( , 2003, Manski and Tamer (2002), and Molinari (2008), among others. In some cases, researchers are only able to characterize a region in the parameter space that includes all the parameter values that may have generated the observables, but may include other (infeasible) parameter values as well.…”

Section: Introductionmentioning

confidence: 99%

Sharp identification regions in models with convex moment predictions

Beresteanu¹,

Molchanov²,

Molinari³

2010

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We provide a tractable characterization of the sharp identi…cation region of the parameters in a broad class of incomplete econometric models. Models in this class have set valued predictions that yield a convex set of conditional or unconditional moments for the observable model variables. In short, we call these models with convex moment predictions. Examples include static, simultaneous move …nite games of complete and incomplete information in the presence of multiple equilibria; best linear predictors with interval outcome and covariate data; and random utility models of multinomial choice in the presence of interval regressors data. Given a candidate value for ; we establish that the convex set of moments yielded by the model predictions can be represented as the Aumann expectation of a properly de…ned random set. The sharp identi…cation region of ; denoted I ; can then be obtained as the set of minimizers of the distance from a properly speci…ed vector of moments of random variables to this Aumann expectation. Algorithms in convex programming can be exploited to e¢ ciently verify whether a candidate is in I : We use examples analyzed in the literature to illustrate the gains in identi…cation and computational tractability a¤orded by our method.

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“…In this case, the model is partially identified. The analyses in Manski (1989Manski ( , 2003, Manski and Tamer (2002), Haile and Tamer (2003), Ciliberto and Tamer (2004) and Andrews, Berry, and Jia (2004) are examples of research studying the identified features of incomplete econometric models.…”

Section: Introductionmentioning

confidence: 99%

“…The region in the parameter space which includes all possible parameter values that could generate the same distribution of observables for some data generation process consistent with the maintained modeling assumptions, and no other parameter value, is called the sharp identification region. Examples of sharp identification regions for parameters of incomplete models are given in Manski (2003) and Manski and Tamer (2002), among others. In some cases, researchers are only able to characterize a region in the parameter space that includes all the parameter values that may have generated the observables, but may include other (infeasible) parameter values as well.…”

Section: Introductionmentioning

confidence: 99%

Sharp identification regions in games

Beresteanu¹,

Molchanov²,

Molinari³

2008

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We study identification in static, simultaneous move finite games of complete information, where the presence of multiple Nash equilibria may lead to partial identification of the model parameters. The identification regions for these parameters proposed in the related literature are known not to be sharp. Using the theory of random sets, we show that the sharp identification region can be obtained as the set of minimizers of the distance from the conditional distribution of game's outcomes given covariates, to the conditional Aumann expectation given covariates of a properly defined random set. This is the random set of probability distributions over action profiles given profit shifters implied by mixed strategy Nash equilibria. The sharp identification region can be approximated arbitrarily accurately through a finite number of moment inequalities based on the support function of the conditional Aumann expectation. When only pure strategy Nash equilibria are played, the sharp identification region is exactly determined by a finite number of moment inequalities. We discuss how our results can be extended to other solution concepts, such as for example correlated equilibrium or rationality and rationalizability.We show that calculating the sharp identification region using our characterization is computationally feasible. We also provide a simple algorithm which finds the set of inequalities that need to be checked in order to insure sharpness. We use examples analyzed in the literature to illustrate the gains in identification afforded by our method.

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Inference on Regressions with Interval Data on a Regressor or Outcome

Cited by 358 publications

References 11 publications

Identification, Data Combination and the Risk of Disclosure

Identification, Data Combination and the Risk of Disclosure

Sharp identification regions in models with convex moment predictions

Sharp identification regions in games

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