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71.
《Journal of Statistical Computation and Simulation》2012,82(17):3432-3445
ABSTRACTThe Lindley distribution is an important distribution for analysing the stress–strength reliability models and lifetime data. In many ways, the Lindley distribution is a better model than that based on the exponential distribution. Order statistics arise naturally in many of such applications. In this paper, we derive the exact explicit expressions for the single, double (product), triple and quadruple moments of order statistics from the Lindley distribution. Then, we use these moments to obtain the best linear unbiased estimates (BLUEs) of the location and scale parameters based on Type-II right-censored samples. Next, we use these results to determine the mean, variance, and coefficients of skewness and kurtosis of some certain linear functions of order statistics to develop Edgeworth approximate confidence intervals of the location and scale Lindley parameters. In addition, we carry out some numerical illustrations through Monte Carlo simulations to show the usefulness of the findings. Finally, we apply the findings of the paper to some real data set. 相似文献
72.
Daniele Coin 《统计学通讯:理论与方法》2017,46(23):11485-11499
The Generalized Error Distribution is a widespread flexible family of symmetric probability distribution. Thanks to its properties it is becoming more and more popular in many science fields therefore determining if a sample is drawn from a GED is an important issue that usually is pursued with a graphical approach. In this paper we present a new goodness-of-fit test for GED that shows good performances for detecting non GED distribution when the alternative distribution is either skewed or a mixture. A comparison between well known tests and this new procedure is performed through a simulation study. We have developed a function that performs the analysis described in this paper in the R environment. The computational time required to compute this procedure is negligible. 相似文献
73.
Control charts are one of the most important methods in industrial process control. The acceptance control chart is generally applied in situations when an X¯ chart is used to control the fraction of conforming units produced by the process and where 6-sigma spread of the process is smaller than the spread in the specification limits. Traditionally, when designing control charts, one usually assumes that the data or measurements are normally distributed. However, this assumption may not be true in some processes. In this paper, we use the Burr distribution, which is employed to represent various non-normal distributions, to determine the appropriate control limits or sample size for the acceptance control chart under non-normality. Some numerical examples are given for illustration. From the presented examples, ignoring the effect of non-normality in the data leads to a higher type I or type II error probability. 相似文献
74.
In this paper an alternative measure for the excess, called standard archα
s
, is introduced. It is only an affine transformation of the classical kurtosis, but has many advantages. It can be defined
as the double relative asymptotic variance of the standard deviation and can be generalized as the double relative asymptotic
variance of any other scale estimator. The inequalities between skewness and kurtosis given inTeuscher andGuiard (1995) are transformed to the corresponding inequalities between skewness and standard arch. 相似文献
75.
Summary Heavy tail distributions can be generated by applying specific non-linear transformations to a Gaussian random variable. Within
this work we introduce power kurtosis transformations which are essentially determined by their generator function. Examples
are theH-transformation of Tukey (1960), theK-transformation of MacGillivray and Cannon (1997) and theJ-transformation of Fischer and Klein (2004).Furthermore, we derive a general condition on the generator function which guarantees
that the corresponding transformation is actually tail-increasing. In this case the exponent of the power kurtosis transformation
can be interpreted as a kurtosis parameter. We also prove that the transformed distributions can be ordered with respect to
the partial ordering of van Zwet (1964) for symmetric distributions. 相似文献
76.
We present the censored regression model with the error term following the asymmetric exponential power distribution. We propose three Markov chain Monte Carlo (MCMC) algorithms: the first one uses the probability integral transformation; the second one uses a combination of the probability integral transformation and random walk draws; while the third one uses random walk draws. Using simulated data we compare the performance of the three MCMC algorithms. Then we compare the posterior means, or Bayes estimates, with maximum likelihood estimates. We estimate the stock option portion of executive compensation as an example of the empirical application. 相似文献
77.
A two shape parameter generalization of the well known family of the Weibull distributions is presented and its properties are studied. The properties examined include the skewness and kurtosis, density shapes and tail character, and relation of the members of the family to those of the Pear-sonian system. The members of the family are grouped in four classes in terms of these properties. Also studied are the extreme value distributions and the limiting distributions of the extreme spacings for the members of the family. It is seen that the generalized Weibull family contains distributions with a variety of density and tail shapes, and distributions which in terms of skewness and kurtosis approximate the main types of curves of the Pearson system. Furthermore, as shown by the extreme value and extreme spacings distributions the family contains short, medium and long tailed distributions. The quantile and density quantile functions are the principle tools used for the structural analysis of the family. 相似文献
78.
This paper studies four methods for estimating the Box-Cox parameter used to transform data to normality. Three of these are based on optimizing test statistics for standard normality tests (the Shapiro-Wilk. skewness, and kurtosis tests); the fourth uses the maximum likelihood estimator of the Box-Cox parameter. The four methods are compared and evaluated with a simulation study, where their performances under different skewness and kurtosis conditions are analyzed. The estimator based on optimizing the Shapiro-Wilk statistic generally gives rise to the best transformations, while the maximum likelihood estimator performs almost as well. Estimators based on optimizing skewness and kurtosis do not perform well in general. 相似文献
79.
This paper is concerned with asymptotic distributions of functions of a sample covariance matrix under the elliptical model. Simple but useful formulae for calculating asymptotic variances and covariances of the functions are derived. Also, an asymptotic expansion formula for the expectation of a function of a sample covariance matrix is derived; it is given up to the second-order term with respect to the inverse of the sample size. Two examples are given: one of calculating the asymptotic variances and covariances of the stepdown multiple correlation coefficients, and the other of obtaining the asymptotic expansion formula for the moments of sample generalized variance. 相似文献
80.
In this paper it will be shown that the exponent p in Lp,-norm P estimation as an explicit function of the sample kurtosis is asymptotically normally distributed. The asymptotic variances of p for two sllch formulae are derived. An alternative formula which implicitly relates p to the sample kurtosis is also discussed. An adaptive procedure for the selection of p when the underlying error distribution is unknown is also suggested. This procedure is used to verify empirically that the asymptotic distribution of p is normal. 相似文献