In this study, we propose a test for the coefficient randomness in autoregressive models where the autoregressive coefficient is local to unity, which is empirically relevant given the results of earlier studies. Under this specification, we theoretically analyze the effect of the correlation between the random coefficient and disturbance on tests' properties, which remains largely unexplored in the literature. Our analysis reveals that the correlation crucially affects the power of tests for coefficient randomness and that tests proposed by earlier studies can perform poorly when the degree of the correlation is moderate to large. The test we propose in this paper is designed to have a power function robust to the correlation. Because the asymptotic null distribution of our test statistic depends on the correlation $\psi$ between the disturbance and its square as earlier tests do, we also propose a modified version of the test statistic such that its asymptotic null distribution is free from the nuisance parameter $\psi$. The modified test is shown to have better power properties than existing ones in large and finite samples.
翻译:在这次研究中,我们建议对自动递减系数在本地与地方一致的自动递减模型中的系数随机性进行测试,根据先前研究的结果,这种测试在经验上具有相关性。在这个规格下,我们从理论上分析随机系数与测试特性扰动之间的相关性的影响,这些影响在文献中基本上尚未探讨。我们的分析表明,这种相关性对系数随机性测试的力量有着至关重要的影响,而早期研究提出的测试在相关程度适中至大的情况下效果可能很差。我们在本文件中提议的测试旨在有一个与相关程度相适应的功率函数。由于我们测试统计数据的无效力分布取决于扰动与先前测试的正方之间的相关性,我们还提议了测试统计的修改版本,即其无效力分布不受扰动参数 $\psi$\psi 的干扰。经证明,在大型和定数样本中,修改后的测试比现有测试的功率性要强。