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초록
For a nonparametric regression model with a fixed design, we consider the model specification test based on a kernel. We find that a bimodal kernel is useful for the model specification test with a correlated error, whereas a conventional unimodal kernel is useful only for an iid error. Another finding is that the model specification test suffers from a convergence rate change depending on whether the errors are correlated or not. These results are verified by deriving an asymptotic null distribution and asymptotic (local) power, and by performing a simulation. The validity of the bimodal kernel for testing is demonstrated with the "drum roller" data (see Laslett (1994) and Altman (1994)).
키워드
bimodal kernel; convergence rate change; correlated error; nonparametric specification test; CENTRAL-LIMIT-THEOREM; GOODNESS-OF-FIT; U-STATISTICS; MODEL
- 제목
- USING A BIMODAL KERNEL FOR A NONPARAMETRIC REGRESSION SPECIFICATION TEST
- 저자
- Park, Cheolyong; Kim, Tae Yoon; Ha, Jeongcheol; Luo, Zhi-Ming; Hwang, Sun Young
- 발행일
- 2015-07
- 유형
- Article
- 권
- 25
- 호
- 3
- 페이지
- 1145 ~ 1161