截断分布族中估计的渐近有效性（II）

本文在一般截断型分布族中给出了参数函数的估计的Ｂａｈａｄｕｒ型渐近有效性的一种定义，验证了常用估计德这种渐近有效性，比较了Ｂａｈａｄｕｒ型与竹内启型渐近有效性之间的关系，系统地给出了具有Ｂａｈａｄｕｒ型但不具竹内启型渐近有效性估计的例子。     

截断分布族中估计的渐近有效性（Ⅱ）

本文在一般截断型分布族中给出了参数函数的估计的Ｂａｈａｄｕｒ型渐近有效性的一种定义，验证了常用估计德这种渐近有效性，比较了Ｂａｈａｄｕｒ型与竹内启型渐近有效性之间的关系，系统地给出了具有Ｂａｈａｄｕｒ型但不具竹内启型渐近有效性估计的例子。     

双边截断型分布族参数函数的渐近最优经验Bayes估计

本文考虑一维双边截断型分布族参数函数在平方损失下的经验 Bayes估计问题 .给定θ,X的条件分布为f (x|θ) =ω(θ1,θ2 ) h(x) I[θ1,θ2 ] (x) dx其中θ =(θ1,θ2 )T(x) =(t1(x) ,t2 (x) ) =(min(x1,… ,xm) ,max(x1,… ,xm) )是充分统计量 ,其边缘密度为 f (t) ,本文通过 f (t)的核估计构造出θ的函数的经验 Bayes估计 ,并证明在一定的条件下是渐近最优的 (a.0 .)     

在单参数双边截断型分布族中参数估计的一种新的渐近效率

为了克服在单参数双边截断型分布族中不能消除参数估计中在Ｂａｈａｒｄｕｒ意义下的超有效病态现象,本文提出了一种新的渐近效率．根据这种效率的定义,对一般 的参数函数,构造了适用的渐近中位无偏的渐近有效估计量．作为全文的理论基础,我们发现了渐近中位无偏估计的最优收敛速度．     

双边截断型分布族参数的经验Bayes估计

在Linex损失函数下,讨论一类双边截断型分布族参数的经验Bayes（EB）估计问题,构造了参数的EB估计,在适当的条件下给出了该估计的收敛速度,最后给出例子,说明定理条件的合理性。     

一维双边截断型分布族中参数函数的经验Bayes估计及其收敛速度

对一维双边截断型分布族构造了参数函数的经验 Ｂａｙｅｓ 估计,在适当的条件下给出了相应的收敛速度,并说明此收敛速度可充分接近 １２ ．     

一般截断族中半参数估计的渐近效率

本文表述了线性参数函数的估计在渐近中位无偏限制下的渐近效率的定义,研究了一般截断型分布族 f(x;θ_1,θ_2)I(θ_1≤x≤θ_2)dx,为函数 c_1θ_1+c_2θ_2构造了一类直观合理的渐近中位无偏的半参数估计,算出了它们的渐近效率,发现了一种有趣现象:效率仅与比值 c_1f(θ_2;θ_1,θ_2)/c_2f(θ_1;θ_1,θ_2)有关;并且当 c_1c_2≥0时,这些估计是渐近有效的,而当 c_1c_2<0时,效率在1与0.7412之间,极小值是0.7412.     

绝对损失下双边截断型分布族参数的渐近最优经验Bayes估计

本文在绝对损失下构造了双边截断型分布族参数的经验Bayes估计,并在合适的条件下证明了该估计的渐近最优性.最后,给出两个有关本文主要结果的例子.     

重截断和的渐近分布

设{X_n,n≥1}是i.i.d.随机变量序列,X_n,1≤…≤X_(n,n)是X_1,…,X_n的次序统计量。又设k_(n,1,) k_(n,2)是满足条件1≤k_(n,1)相似文献   

截断样本下的强率函数和密度函数核估计的渐进正态性

本文用[1]发展的计数过程去研究截断样本下强率函数核估计的渐进正态性．在弱于[7]和[10]的条件下，得到了更一般的结果．接着我们将这种方法运用到密度函数核估计，在较弱的条件下，得到了截断样本下密度函数核估计的渐进正态性．     

Some General Characterizations of the Bivariate Gumbel Distribution and the Bivariate Lomax Distribution Based on Truncated Expectations

Recently attempts have been made to characterize probability distributions via truncated expectations in both univariate and multivariate cases. In this paper we will use a well known theorem of Lau and Rao (1982) to obtain some characterization results, based on the truncated expectations of a functionh, for the bivariate Gumbel distribution, a bivariate Lomax distribution, and a bivariate power distribution. The results of the paper subsume some earlier results appearing in the literature.     

关于可靠性生存寿命分析中几类重要截尾分布函数参数的最佳有效无偏估计

在给出了可靠性生存寿命分析几类重要随机截尾分布函数的基础上,讨论了寿命分布函数参数的最佳有效无偏估计,为解决可靠性生存寿命分析以及通讯工程和电力负载预测中的最佳无偏误差估计问题提供了令人满意的可靠依据和有效算法．     

Monotonicity and Asymptotic Queue-Length Distribution in Discrete-Time Networks

For closed, cyclic, discrete-time networks with one server per node and with independent, geometric service times, in equilibrium, the joint queue-length distribution can be realized as the joint distribution of independent random variables, conditionally given their sum. This tool helps establish monotonicity properties of performance measures and also helps show that the queue-length random variables are negatively associated. The queue length at a node is asymptotically analyzed through a family of networks with a fixed number of node types, where the number of nodes approaches infinity, the ratio of jobs to nodes has a positive limit, and each node type has a limiting density. The queue-length distribution at any node is shown to converge, in a strong sense, to a distribution that is conditionally geometric. As a by-product, this approach settles open issues regarding occupancy proportion and average queue length at a node type.     

高阶柯西中值定理中间点的渐近性及误差估计

利用洛必达法则研究长度趋于零和长度趋于无穷大的两类区间上高阶柯西值定理中间点的渐近性及其误差估计.     

非正则平移分布位置参数极大似然估计的极限分布及渐近有效性

In this paper, we consider the location model Y=θ e,where θ is an unknown parameter, and e is the error belonging to the interval [a, b]. We assume that e has the following density function.     

On the distribution of Pickands coordinates in bivariate EV and GP models

Let (U,V) be a random vector with U0, V0. The random variables Z=V/(U+V), C=U+V are the Pickands coordinates of (U,V). They are a useful tool for the investigation of the tail behavior in bivariate peaks-over-threshold models in extreme value theory.We compute the distribution of (Z,C) among others under the assumption that the distribution function H of (U,V) is in a smooth neighborhood of a generalized Pareto distribution (GP) with uniform marginals. It turns out that if H is a GP, then Z and C are independent, conditional on C>c−1.These results are used to derive approximations of the empirical point process of the exceedances (Z_i,C_i) with C_i>c in an iid sample of size n. Local asymptotic normality is established for the approximating point process in a parametric model, where c=c(n)↑0 as n→∞.