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随机过程W_n(x,y)的局部渐近性质 被引量:1

Local Asymptotic Behavior of W_n(x,y)in the Stochastic Process
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摘要 本文讨论了随机过程Wn(x,y)的局部渐近性质,得出y在点y0的邻域取值时,过程弱收敛于Gaussian 过程. In this paper the local asymptotic behavior of the stochastic process is investigated: Wn( x, y). The conclusion that for fixed point y0, Wn( x, y),converges weakly to a Gaussian process is proved.
作者 吴建国
机构地区 湖南财经高等专科学校
出处 《吉林师范大学学报(自然科学版)》 2005年第4期56-57,共2页 Journal of Jilin Normal University:Natural Science Edition
关键词 随机过程 渐近性质 高斯过程 stochastic process asymptotic property Gaussian process
分类号 O213 [理学—概率论与数理统计]
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参考文献3

  • 1Bhattacharya P K,Mack Y P.Weak convergence of k - NN density density and regression estimators with varying k and applications[J].Ann.Stat,1987,15:976 ~ 994.
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  • 3Fan J,Zhang C M.A re- examination of Stantan's diffusion estimators with applications to financial model validation[J].J.Amer.Statist.Assoc,2003,98:118~ 134.

同被引文献7

  • 1DANIELS H E. The Maximum of a Gaussian Process Whose Mean Path Has a Maximum, With an Application to the Strength of Bundles of Fibres [J]. Adv Appl Prob,1989, 21:315 - 333.
  • 2SMITH R L. The Asymptotic Distribution of the Strength of a Series-parallel System with Equal load-sharing[ J]. Ann Prob, 1982, 10:137- 171.
  • 3FAN J, ZHANG C M. A Re-examination of Stantan's Diffusion Estimators With Applications to Financial Model Validation[J] .J Amer Statist Assoc, 2003,98 : 118 - 134.
  • 4FRANKE J, KREISS J P, MAMMEN E. Bootstrap of Kernel Smoothing in Nonlinear time Series [ J ]. Bernoulli, 2002,8 : 1 - 37.
  • 5BHATTACHARYA P K, GANGOPADHYAY A K. Kernel and Nearest Neighbor Estimation of a Conditional Quantile [ J]. Ann Stat, 1990,18 : 1400 - 1414.
  • 6STUTIZER M. A Simple Nonparametric Approach to Derivative Security Valuation [J] .J Finance, 1996,51:1633 - 1652.
  • 7SUH M W, BHATTACHARYYA B B, GRANDAGE A. On the Distributions of the Strength of a Bundle of Filaments[J] .J Ann Prob, 1970,7:712 - 720.

引证文献1

吉林师范大学学报(自然科学版)
2005年 第4期

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