摘要
To estimate central dimension-reduction space in multivariate nonparametric rcgression, Sliced Inverse Regression (SIR), Sliced Average Variance Estimation (SAVE) and Slicing Average Third-moment Estimation (SAT) have been developed, Since slicing estimation has very different asymptotic behavior for SIR, and SAVE, the relevant study has been madc case by case, when the kernel estimators of SIH and SAVE share similar asymptotic properties. In this paper, we also investigate kernel estimation of SAT. We. prove the asymptotic normality, and show that, compared with tile existing results, the kernel Slnoothing for SIR, SAVE and SAT has very similar asymptotic behavior,
To estimate central dimension-reduction space in multivariate nonparametric rcgression, Sliced Inverse Regression (SIR), Sliced Average Variance Estimation (SAVE) and Slicing Average Third-moment Estimation (SAT) have been developed, Since slicing estimation has very different asymptotic behavior for SIR, and SAVE, the relevant study has been madc case by case, when the kernel estimators of SIH and SAVE share similar asymptotic properties. In this paper, we also investigate kernel estimation of SAT. We. prove the asymptotic normality, and show that, compared with tile existing results, the kernel Slnoothing for SIR, SAVE and SAT has very similar asymptotic behavior,
