TY - JOUR
T1 - Valid edgeworth expansions of M-estimators in regression models with weakly dependent residuals
AU - Taniguchi, Masanobu
AU - Puri, Madan L.
PY - 1996
Y1 - 1996
N2 - Consider a linear regression model yt = xtβ + ut, where the ut's are weakly dependent random variables, the xt's are known design nonrandom variables, and β is an unknown parameter. We define an M-estimator β̂n of β corresponding to a smooth score function. Then, the second-order Edgeworth expansion for β̂n is derived. Here we do not assume the normality of {ut}, and {ut} includes the usual ARMA processes. Second, we give the second-order Edgeworth expansion for a transformation T(β̂n) of β̂n. Then, a sufficient condition for T to extinguish the second-order terms is given. The results are applicable to many statistical problems.
AB - Consider a linear regression model yt = xtβ + ut, where the ut's are weakly dependent random variables, the xt's are known design nonrandom variables, and β is an unknown parameter. We define an M-estimator β̂n of β corresponding to a smooth score function. Then, the second-order Edgeworth expansion for β̂n is derived. Here we do not assume the normality of {ut}, and {ut} includes the usual ARMA processes. Second, we give the second-order Edgeworth expansion for a transformation T(β̂n) of β̂n. Then, a sufficient condition for T to extinguish the second-order terms is given. The results are applicable to many statistical problems.
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U2 - 10.1017/s0266466600006617
DO - 10.1017/s0266466600006617
M3 - Article
AN - SCOPUS:0030541391
SN - 0266-4666
VL - 12
SP - 331
EP - 346
JO - Econometric Theory
JF - Econometric Theory
IS - 2
ER -