M’barek Iaousse, Zouhair Elhadri, M. Hanafi, P. Dolce, Y. Elkettani
{"title":"Properties of the Correlation Matrix Implied by a Recursive Path Model using the Finite Iterative Method","authors":"M’barek Iaousse, Zouhair Elhadri, M. Hanafi, P. Dolce, Y. Elkettani","doi":"10.1285/I20705948V13N2P413","DOIUrl":null,"url":null,"abstract":"The present paper announces and demonstrates some useful properties of the impliedcorrelation matrix built by the Finite Iterative Method (Elhadri and Hanafi,2015, 2016; Elhadri et al., 2019) The most important property is that the impliedcorrelation matrix is affine for each of its parameters. In other words, the firstderivative with respect to each parameter does not depend on this parameter. Moreover,two properties affirm that the first and the second derivatives can be builtiteratively using the previous property. The final property shows that the secondderivatives with respect to every pair ofparameters in the same structural equationare null. These properties are very important in the sense that they can be used toconstruct a new computational approach to estimate recursive model parameters.These findings can be exploited in the estimation stage implementation, especiallyin the computation of the Newton Raphson algorithm to make the first and the secondderivatives of the discrepancy function more explicit and simplistic.","PeriodicalId":44770,"journal":{"name":"Electronic Journal of Applied Statistical Analysis","volume":"24 9","pages":"413-435"},"PeriodicalIF":0.6000,"publicationDate":"2020-10-14","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"4","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Electronic Journal of Applied Statistical Analysis","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/10.1285/I20705948V13N2P413","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q4","JCRName":"STATISTICS & PROBABILITY","Score":null,"Total":0}
引用次数: 4
Abstract
The present paper announces and demonstrates some useful properties of the impliedcorrelation matrix built by the Finite Iterative Method (Elhadri and Hanafi,2015, 2016; Elhadri et al., 2019) The most important property is that the impliedcorrelation matrix is affine for each of its parameters. In other words, the firstderivative with respect to each parameter does not depend on this parameter. Moreover,two properties affirm that the first and the second derivatives can be builtiteratively using the previous property. The final property shows that the secondderivatives with respect to every pair ofparameters in the same structural equationare null. These properties are very important in the sense that they can be used toconstruct a new computational approach to estimate recursive model parameters.These findings can be exploited in the estimation stage implementation, especiallyin the computation of the Newton Raphson algorithm to make the first and the secondderivatives of the discrepancy function more explicit and simplistic.
本文宣布并证明了有限迭代法建立的隐相关矩阵的一些有用性质(Elhadri和Hanafi,20152016;Elhadri et al.,2019)。最重要的性质是隐相关矩阵对其每个参数都是仿射的。换句话说,关于每个参数的一阶导数不取决于这个参数。此外,有两个性质证实了一阶导数和二阶导数可以使用前面的性质重复构建。最后的性质表明,对于同一结构方程中的每一对参数的二阶导数为零。这些性质非常重要,因为它们可以用来构建一种新的计算方法来估计递归模型参数。这些发现可以在估计阶段的实现中加以利用,特别是在Newton-Raphson算法的计算中,使差异函数的一阶和二阶导数更加明确和简单。