BOOTSTRAP FOR ORDER IDENTIFICATION IN ARMA(p,q) STRUCTURES

Anselmo Chaves Neto,Thais Mariane Biembengut Faria

doi:10.14807/ijmp.v6i1.244

Anselmo Chaves Neto, Thais Mariane Biembengut Faria

Open Access

https://doi.org/10.14807/ijmp.v6i1.244

Copy DOI

Abstract

The identification of de order p,q, of ARMA models is a critical step in time-series modelling. In classic Box-Jenkins method of identification the autocorrelation function (ACF) and the partial autocorrelation (PACF) function should be estimated, but the classical expressions used to measure the variability of the respective estimators are obtained on the basis of asymptotic results. In addition, when having sets of few observations, the traditional confidence intervals to test the null hypotheses display low performance. The bootstrap method may be an alternative for identifying the order of ARMA models, since it allows to obtain an approximation of the distribution of the statistics involved in this step. Therefore it is possible to obtain more accurate confidence intervals than those obtained by the classical method of identification. In this paper we propose a bootstrap procedure to identify the order of ARMA models. The algorithm was tested on simulated time series from models of structures AR(1), AR(2), AR(3), MA(1), MA(2), MA(3), ARMA(1,1) and ARMA (2,2). This way we determined the sampling distributions of ACF and PACF, free from the Gaussian assumption. The examples show that the bootstrap has good performance in samples of all sizes and that it is superior to the asymptotic method for small samples.

Highlights

Let the following be a stationary stochastic process in which for the equation is the solution (1) ⋯The associated series π B 1 ∑ π B converges and is nonzero for ∣ B ∣⩽ 1
In the classic procedure for the identification of the order of ARMA(p,q) models proposed by Box and Jenkins (1994), the autocorrelation and partial autocorrelation functions based on the time series are estimated
In order to evaluate the performance of the bootstrap procedure, by comparing it with the asymptotic method, we simulated time series from ARMA models

Summary

Introduction

Let the following be a stationary stochastic process in which for the equation is the solution (1) ⋯The associated series π B 1 ∑ π B converges and is nonzero for ∣ B ∣⩽ 1. The bootstrap method may be an alternative for identifying the order of ARMA models, since it allows to obtain an approximation of the distribution of the statistics involved in this step. Paparoditis (1992) has studied the identification of models by considering the vector of autocorrelation, and by applying the bootstrap in the evaluation of the sampling distributions of the correspondent involved statistics.

Results

Conclusion