截面数据异方差问题检验技术的比较

在忽略异方差的情况下,进行模型的OLS参数估计会导致严重的后果,因此,研究异方差性的检验、选取适当的检验方法是非常重要的理论与实践问题.文章基于蒙特卡罗随机模拟技术,分别在Permutation Test与传统形式下对异方差检验的主要方法有:White检验、Park检验、Goldfeld-Quandt检验、Breusch-Pagan/Godfrey检验、Glejser检验,在不同的异方差假定形式下、在不同的样本容量下对这五种检验方法的第一类错误率的控制、检验功效等方面进行充分、完备的研究和讨论,并给出结论供实践工作者参考.     

异方差帕克检验方法的改进

围绕传统的帕克检验方法展开研究,针对该方法在对多元线性回归模型进行异方差检验时工作量大、计算繁琐、异方差模型不够准确这一系列问题,提出运用主成分的思想,将得到的所有综合指标建立异方差模型,并对不同形式的数据条件进行研究,根据系数的显著性检验,给出了一种新的异方差检验方法。模拟数据和实例论证表明该检验方法更为快捷准确。     

一种多变量线性回归模型的异方差检验方法

文章在G-Q检验的基础上,给出了一种针对多变量的推广的G-Q异方差检验方法,并通过实例分析说明了推广的G-Q异方差检验方法的可行性和有效性。     

单向面板回归模型中异方差类型的确定性检验框架

结合White检验和Hausman检验,在一个检验框架内对单向面板回归模型中异方差的七种类型进行研究,将误差项中的个体效应和时间效应进行分离,给出异方差类型的确定性检验方法和步骤。应用中国城镇居民总消费、居住消费和收入的数据进行实证分析,证实异方差类型确定性检验方法的实用性和可行性。     

一类基于非参数回归的条件异方差检验

现有基于参数模型构造的条件异方差检验往往存在模型设定偏误问题。为了避免模型误设对检验结果的影响,并且同时捕获多种条件异方差现象,本文基于非参数回归构造了不依赖于特定模型形式的条件异方差检验统计量。该统计量可视作条件方差和无条件方差之间差异的加权平均,在原假设成立时渐近服从标准正态分布。数值模拟结果一方面表明本文统计量具有良好的有限样本性质,另一方面也说明条件均值模型误设会导致错误地拒绝条件同方差的原假设,凸显了本文引入非参数方法构造条件异方差检验的必要性。实证分析采用本文统计量探讨了国际主要股指收益率的条件异方差现象,得到了与Engle (1982)不同的检验结果,可能意味着股指收益率呈现出非线性动态特征。     

时间序列分析中的异方差性

文章阐述异方差性在时间序列分析中的影响及识别方法 ,并比较各方法的应用特点。以双能 X线骨密度仪基线漂移数据为例 ,说明异方差性的一种检验手段。能够识别出序列中的方差变化区域及显著变化区域。对时间序列中的异方差性 ,建议使用假设检验方法予以判别     

季节异方差序列的季节调整问题研究

季节调整是从经济序列中剔除季节成分的重要方法。季节异方差的存在,使经典的季节调整方法无法彻底分离出季节成分,致使季节调整失败。本文针对季节异方差问题提出用于季节调整的改进的HS模型,并定义改进的HS模型构造季节异方差检验LR统计量,通过蒙特卡洛模拟方法分析该检验的检验尺度和检验功效。最后,利用我国税收总额月度序列给出实证分析,并通过对比考察了改进的HS模型方法季节调整的有效性。     

单因素方差分析中异方差的检验与修正

文章在单因素方差分析模型的基础上,通过散点图和方差齐性检验,判断模型中是否存在异方差性.如果存在异方差,进一步讨论异方差出现的原因及如何进行修正,使单因素方差分析在理论上更加完善.     

异方差模型参数估计的有效性研究

本文运用随机模拟方法,对误差序列异方差模型中加权最小二乘（GLS）估计的有效性进行研究。研究表明,GLS估计的有效性与异方差强度有关,当异方差强度较强时,GLS估计比普通最小二乘（OLS）估计有效;当异方差强度较弱时,GLS估计不如OLS估计有效。     

STAR模型框架下的wild bootstrap单位根检验

考虑随机误差项存在异方差的情形,文章建立了STAR模型框架下的wild bootstrap单位根检验策略.Monte Carlo模拟研究的结果表明,若时间序列存在GARCH异方差,KSS非线性单位根检验统计量的检验水平扭曲程度要远高于线性ADF统计量,且GARCH特征越明显,扭曲程度越高.无论GARCH特征明显与否,wild bootstrap单位根检验方法都不存在检验水平扭曲,且具有理想的检验势.     

Dimension test approach of heteroscedasticity in the linear model

Heteroscedasticity testing has a long history and is still an important matter in the linear model. There exist many types of tests, but they are limited in use to their own specific cases and sensitive to normality. Here, we propose a dimension test approach to heteroscedasticity. The proposed test overcomes the shortcomings of the existing methods, so that it is robust to normality and is unified in sense that it is applicable in the linear model with multi-dimensional response. Numerical studies confirm that the proposed test is favorable over the existing tests with moderate sample sizes, and real data analysis is presented.     

An efficiency Bayesian unit root test in Unobserved-ARCH models

This paper investigates the new prior distribution on the Unobserved-Autoregressive Conditional Heteroscedasticity (ARCH) unit root test. Monte Carlo simulations show that the sample size is seriously effective in efficiency of Bayesian test. To improve the performance of Bayesian test for unit root, we propose a new Bayesian test that is robust in the presence of stationary and nonstationary Unobserved-ARCH. The finite sample property of the proposed test statistic is evaluated using Monte Carlo studies. Applying the developed method, we test the policy of daily exchange rate of the German Marc with respect to the Greek Drachma.     

An F-type small sample simultaneous test for nested linear regression models

A small sample simultaneous testing method is proposed for nested linear regression model. The methodology is based on the generalized likelihood ratio test which is the large sample simultaneous testing method for general nested models. The proposed test is also used for model identification.     

A consistent test for heteroscedasticity in semi-parametric regression with nonparametric variance function based on the kernel method

It is important to detect the variance heterogeneity in regression models. Heteroscedasticity tests have been well studied in parametric and nonparametric regression models. This paper presents a consistent test for heteroscedasticity for nonlinear semi-parametric regression models with nonparametric variance function based on the kernel method. The properties of the test are investigated through Monte Carlo simulations. The test methods are illustrated with a real example.     

Tests of heteroscedasticity and correlation in multivariate t regression models with AR and ARMA errors

Heteroscedasticity checking in regression analysis plays an important role in modelling. It is of great interest when random errors are correlated, including autocorrelated and partial autocorrelated errors. In this paper, we consider multivariate t linear regression models, and construct the score test for the case of AR(1) errors, and ARMA(s,d) errors. The asymptotic properties, including asymptotic chi-square and approximate powers under local alternatives of the score tests, are studied. Based on modified profile likelihood, the adjusted score test is also developed. The finite sample performance of the tests is investigated through Monte Carlo simulations, and also the tests are illustrated with two real data sets.     

Application of Anbar's Approach to Hypothesis Testing to Detect the Difference between Two Proportions

In this paper, Anbar's (1983) approach for estimating a difference between two binomial proportions is discussed with respect to a hypothesis testing problem. Such an approach results in two possible testing strategies. While the results of the tests are expected to agree for a large sample size when two proportions are equal, the tests are shown to perform quite differently in terms of their probabilities of a Type I error for selected sample sizes. Moreover, the tests can lead to different conclusions, which is illustrated via a simple example; and the probability of such cases can be relatively large. In an attempt to improve the tests while preserving their relative simplicity feature, a modified test is proposed. The performance of this test and a conventional test based on normal approximation is assessed. It is shown that the modified Anbar's test better controls the probability of a Type I error for moderate sample sizes.     

A Criterion for Stepwise Regression

In “stepwise” regression analysis, the usual procedure enters or removes variables at each “step” on the basis of testing whether certain partial correlation coefficients are zero. An alternative method suggested in this paper involves testing the hypothesis that the mean square error of prediction does not decrease from one step to the next. This is equivalent to testing that the partial correlation coefficient is equal to a certain nonzero constant. For sample sizes sufficiently large, Fisher's z transformation can be used to obtain an asymptotically UMP unbiased test. The two methods are contrasted with an example involving actual data.     

An empirical comparison of several methods for testing the equality of dependent proportions

Three methods for testing the equality of nonindependent proportions were compared with, the use of Monte Carlo techniques. The three methods included Cochran's test, an ANOVA F test, and Hotelling's T² test. With respect to empirical significance levels, the ANOVA F test is recommended as the preferred method of analysis.

Oftentimes an experimenter is interested in testing the equality of several proportions. When the proportions are independent Kemp and Butcher (1972) and Butcher and Kemp (1974) compared several methods for analysing large sample binomial data for the case of a 3 x 3 factorial design without replication. In addition, Levy and Narula (1977) compared many of the same methods for analyzing binomial data; however, Levy and Narula investigated the relative utility of the methods for small sample sizes.     

Interval Estimation for the Difference of Two Independent Variances

Analytical methods for interval estimation of differences between variances have not been described. A simple analytical method is given for interval estimation of the difference between variances of two independent samples. It is shown, using simulations, that confidence intervals generated with this method have close to nominal coverage even when sample sizes are small and unequal and observations are highly skewed and leptokurtic, provided the difference in variances is not very large. The method is also adapted for testing the hypothesis of no difference between variances. The test is robust but slightly less powerful than Bonett's test with small samples.     

Testing the equality of two high‐dimensional spatial sign covariance matrices

This paper is concerned with testing the equality of two high‐dimensional spatial sign covariance matrices with applications to testing the proportionality of two high‐dimensional covariance matrices. It is interesting that these two testing problems are completely equivalent for the class of elliptically symmetric distributions. This paper develops a new test for testing the equality of two high‐dimensional spatial sign covariance matrices based on the Frobenius norm of the difference between two spatial sign covariance matrices. The asymptotic normality of the proposed testing statistic is derived under the null and alternative hypotheses when the dimension and sample sizes both tend to infinity. Moreover, the asymptotic power function is also presented. Simulation studies show that the proposed test performs very well in a wide range of settings and can be allowed for the case of large dimensions and small sample sizes.