基于秩的自回归阶数识别

Rank-Based Autoregressive Order Identification

Journal of the American Statistical Association · 1999
被引 6
ABS 4

中文导读

研究了基于秩的最优方法在自回归移动平均模型阶数识别中的有限样本表现,发现非高斯或存在异常值时,秩方法比传统方法更准确,且不受异常值影响。

Abstract

Optimal rank-based procedures have been derived for testing arbitrary linear restrictions on the parameters of autoregressive moving average (ARMA) models with unspecified innovation densities. The finite-sample performances of these procedures are investigated here in the context of AR order identification and compared to those of classical (partial correlograms and Lagrange multipliers) methods. The results achieved by rank-based methods are quite comparable, in the Gaussian case, to those achieved by the traditional ones, which, under Gaussian assumptions, are asymptotically optimal. However, under non-Gaussian innovation densities, especially heavy-tailed or nonsymmetric, or when outliers are present, the percentages of correct order selection based on rank methods are strikingly better than those resulting from traditional approaches, even in the case of very short (n = 25) series. These empirical findings confirm the often ignored theoretical fact that the Gaussian case, in the ARMA context, is the least favorable one. The robustness properties of rank-based identification methods are also investigated; it is shown that, contrary to the robustified versions of their classical counterparts, the proposed rank-based methods are not affected, neither by the presence of innovation outliers nor by that of observation (additive) outliers.

时间序列分析自回归移动平均模型秩检验稳健统计异常值检测