共查询到20条相似文献,搜索用时 125 毫秒
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带有不完全信息随机截尾试验下Weibull分布参数的MLE的相合性及渐近正态性 总被引:13,自引:0,他引:13
本文证明了,对于Weibull分布,基于带有不完全信息随机截尾试验获得的参数的极大似然估计(MLE)具有强相合性及渐近正态性 相似文献
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本文在一些弱的条件下,对自然联系函数和自适应设计下广义线性模型的极大拟似然估计渐近性进行研究,获得了极大拟似然估计的渐近存在性、弱相合性、收敛速度及渐近正态性.并通过蒙特卡罗数值模拟的方法对所得结果进行验证. 相似文献
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伽玛分布的尺度参数及自协方差估计 总被引:4,自引:0,他引:4
本文发现伽玛分布的尺度参数等于随机变量及其对数的协方差,并利用这一有趣性质构造伽玛分布参数的自协方差估计。此法计算简便,结果优于矩估计,与极大似然估计十分接近。鉴于极大似然估计的修偏问题未予解决,本文所建议的无偏自协方差估计可以在小样本情形下弥补极大似然估计有偏的不足,自协方差估计的相合性、渐近正态性等大样本性质也得到了讨论。给出的模拟试验结果基本符台论证。 相似文献
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研究了一个简化的新的Laplace AR(1)模型参数的条件最小二乘估计和最大拟似然估计,并讨论了它们的强相合性和渐近正态性.通过数值模拟和实际例子,说明了最大拟似然估计及模型的优越性. 相似文献
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讨论了响应变量为单参数指数族且在零点处膨胀的广义线性模型的大样本性质,对其参数进行了极大似然估计,给出了一些正则条件.基于所提出的正则条件,证明了模型参数极大似然估计的相合性与渐近正态性. 相似文献
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拟似然非线性模型包括广义线性模型作为一个特殊情形.给出了拟似然非线性模型中极大拟似然估计的弱相合性的一些充分条件,其中矩的条件要弱于文献中极大拟似然估计的强相合性的条件. 相似文献
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研究了随机截尾情形下Rayleigh分布参数的最大似然估计,研究了最大似然估计的存在唯一性;在很一般的条件下证明了估计的强、弱相合性和渐近正态性. 相似文献
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The paper investigates the asymptotic theory for a multivariate GARCH model in its general vector specification proposed by Bollerslev, Engle and Wooldridge (1988) [4], known as the VEC model. This model includes as important special cases the so-called BEKK model and many versions of factor GARCH models, which are often used in practice. We provide sufficient conditions for strict stationarity and geometric ergodicity. The strong consistency of the quasi-maximum likelihood estimator (QMLE) is proved under mild regularity conditions which allow the process to be integrated. In order to obtain asymptotic normality, the existence of sixth-order moments of the process is assumed. 相似文献
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Yacouba Boubacar Maïnassara 《Comptes Rendus Mathematique》2011,349(13-14):817-820
In this Note, we consider the problems of estimating the asymptotic variance of the quasi-maximum likelihood estimator (QMLE) of vector autoregressive moving-average (VARMA) models under the assumption that the errors are uncorrelated but not necessarily independent (i.e. weak VARMA). We first give expressions for the derivatives of the VARMA residuals in terms of the parameters of the models. Secondly we give an explicit expression of the asymptotic variance of the QMLE, in terms of the VAR and MA polynomials, and of the second- and fourth-order structure of the noise. We deduce a consistent estimator of the asymptotic variance of the QMLE. 相似文献
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We propose the Gaussian quasi-maximum likelihood estimator (QMLE) to detect and locate multiple volatility shifts. Our Gaussian QMLE is shown to be consistent under suitable conditions and the rate of convergence is provided. It is also shown that the binary segmentation procedure provides a consistent estimation for the number of volatility shifts. 相似文献
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The dynamic conditional correlation(DCC) model has been widely used for modeling the conditional correlation of multivariate time series by Engle(2002). However, the stationarity conditions have been established only recently and the asymptotic theory of parameter estimation for the DCC model has not yet to be fully discussed. In this paper, we propose an alternative model, namely the scalar dynamic conditional correlation(SDCC) model. Sufficient and easily-checked conditions for stationarity, geometric ergodicity, andβ-mixing with exponential-decay rates are provided. We then show the strong consistency and asymptotic normality of the quasi-maximum-likelihood estimator(QMLE) of the model parameters under regular conditions.The asymptotic results are illustrated by Monte Carlo experiments. As a real-data example, the proposed SDCC model is applied to analyzing the daily returns of the FSTE(financial times and stock exchange) 100 index and FSTE 100 futures. Our model improves the performance of the DCC model in the sense that the Li-Mc Leod statistic of the SDCC model is much smaller and the hedging efficiency is higher. 相似文献
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Y. Boubacar Mainassara 《Journal of multivariate analysis》2011,102(3):496-505
The asymptotic properties of the quasi-maximum likelihood estimator (QMLE) of vector autoregressive moving-average (VARMA) models are derived under the assumption that the errors are uncorrelated but not necessarily independent nor martingale differences. Relaxing the martingale difference assumption on the errors considerably extends the range of application of the VARMA models, and allows one to cover linear representations of general nonlinear processes. Conditions are given for the asymptotic normality of the QMLE. Particular attention is given to the estimation of the asymptotic variance matrix, which may be very different from that obtained in the standard framework. 相似文献
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For the Generalized Linear Model (GLM), under some conditions including that the specification of the expectation is correct, it is shown that the Quasi Maximum Likelihood Estimate (QMLE) of the parameter-vector is asymptotic normal. It is also shown that the asymptotic covariance matrix of the QMLE reaches its minimum (in the positive-definte sense) in case that the specification of the covariance matrix is correct. 相似文献
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This paper studies asymptotic properties of the quasi maximum likelihood and weighted least squares estimates (QMLE and WLSE)
of the conditional variance slope parameters of a strictly unstable ARCH model with periodically time varying coefficients
(PARCH in short). The model is strictly unstable in the sense that its parameters lie outside the strict periodic stationarity
domain and its boundary. Obtained from the regression form of the PARCH, the WLSE is a variant of the least squares method
weighted by the square of the conditional variance evaluated at any fixed value in the parameter space. In calculating the
QMLE and WLSE, the conditional variance intercepts are set to any arbitrary values not necessarily the true ones. The theoretical
finding is that the QMLE and WLSE are consistent and asymptotically Gaussian with the same asymptotic variance irrespective
of the fixed conditional variance intercepts and the weighting parameters. So because of its numerical complexity, the QMLE
may be dropped in favor of the WLSE which enjoys closed form. 相似文献
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Abdelhakim Aknouche 《Statistical Inference for Stochastic Processes》2012,15(3):241-256
For an ARCH model, we propose a multistage weighted least squares (WLS) estimate which consists of repeated WLS procedures until the corresponding asymptotic variance equals that of the quasi-maximum likelihood estimate (QMLE). At every stage, the current estimate is of a WLS type weighted by the squared conditional variance evaluated at the estimate of the previous stage. Initially, the weighting parameter is any fixed and known value in the parameter space. The procedure provides, without any moment requirement, an asymptotically Gaussian estimate having the same asymptotic distribution as the QMLE even in the unstable case. Apart from the initialization stage, two additional stages are required in the stable case to obtain the same asymptotic distribution as the QMLE, while in the unstable case only one stage is enough. So in all, the proposed procedure involves three stages WLS in the stable case and two stages WLS in the unstable case. 相似文献
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Yacouba Boubacar Mainassara 《Comptes Rendus Mathematique》2010,348(15-16):927-929
In this Note, we consider portmanteau tests for testing the adequacy of vector autoregressive moving-average (VARMA) models under the assumption that the errors are uncorrelated but not necessarily independent. We relax the standard independence assumption to extend the range of application of the VARMA models, allowing us to treat linear representations of general nonlinear processes. We first study the joint distribution of the quasi-maximum likelihood estimator (QMLE) and the noise empirical autocovariances. We thus obtain the asymptotic distribution of residual empirical autocovariances and autocorrelations under weak assumptions on the noise. We deduce the asymptotic distribution of the Ljung–Box (or Box–Pierce) portmanteau statistics for VARMA models with nonindependent innovations. We propose a method to adjust the critical values of the portmanteau tests. 相似文献
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We consider the estimation of the affine parameter and power-law exponent in the preferential attachment model with random initial degrees. We derive the likelihood, and show that the maximum likelihood estimator (MLE) is asymptotically normal and efficient. We also propose a quasi-maximum-likelihood estimator (QMLE) to overcome the MLE’s dependence on the history of the initial degrees. To demonstrate the power of our idea, we present numerical simulations. 相似文献