@article{oai:ynu.repo.nii.ac.jp:00006832,
 author = {Mehra, K. L. and Ramakrishnaiah, Y. S. and Rao, M. Sudhakara},
 issue = {1},
 journal = {Yokohama Mathematical Journal = 横濱市立大學紀要. D部門, 数学},
 month = {},
 note = {application/pdf, Let ＄￥{(X_{n}, Y_{n}) : n=1,2, ￥cdots￥}＄ be a strictly stationary strong mixing sequence of random vectors in ＄R^{d+p}＄ and denote by ＄r_{￥phi}(x_{0})=E[￥phi(Y)|X=x_{0}]＄ , where ＄￥phi＄ is a real Borel function defined on ＄R^{p},＄ ＄P￥geqq 1＄ . In this paper, we prove for the above sequence, the asymptotic normality of the rank nearest neighbor kernel estimators of ＄r_{￥phi}(x_{0})＄ , studied by Yang [11], Stute [10] and Yoshihara [13].},
 pages = {49--60},
 title = {ASYMPTOTIC NORMALITY OF RANK NEAREST NEIGHBOR REGRESSION FUNCTION ESTIMATORS UNDER STRONG MIXING},
 volume = {39},
 year = {1991}
}