Set Identified Linear Models
成果类型:
Article
署名作者:
Bontemps, Christian; Magnac, Thierry; Maurin, Eric
署名单位:
Universite de Toulouse; Universite Toulouse 1 Capitole; Toulouse School of Economics; Paris School of Economics
刊物名称:
ECONOMETRICA
ISSN/ISSBN:
0012-9682
DOI:
10.3982/ECTA7637
发表日期:
2012
页码:
1129-1155
关键词:
confidence-intervals
inference
parameters
regressions
errors
variables
regions
摘要:
We analyze the identification and estimation of parameters beta satisfying the incomplete linear moment restrictions E(z(inverted perpendicular)(x beta-y)) = E(z(inverted perpendicular)u(z)), where z is a set of instruments and u(z) an unknown bounded scalar function. We first provide empirically relevant examples of such a setup. Second, we show that these conditions set identify beta where the identified set B is bounded and convex. We provide a sharp characterization of the identified set not only when the number of moment conditions is equal to the number of parameters of interest, but also in the case in which the number of conditions is strictly larger than the number of parameters. We derive a necessary and sufficient condition of the validity of supernumerary restrictions which generalizes the familiar Sargan condition. Third, we provide new results on the asymptotics of analog estimates constructed from the identification results. When B is a strictly convex set, we also construct a test of the null hypothesis, beta(0)is an element of B, whose size is asymptotically correct and which relies on the minimization of the support function of the set B- {beta 0}. Results of some Monte Carlo experiments are presented.
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