Box–Jenkins method: Difference between revisions

In [[time series analysis]], the '''Box–Jenkins method,''',<ref>{{cite book |lastlast1=Box |firstfirst1=George |last2=Jenkins |first2=Gwilym |year=1970 |title=Time Series Analysis: Forecasting and Control |url=https://archive.org/details/timeseriesanalys0000boxg |url-access=registration |___location=San Francisco |publisher=Holden-Day }}</ref> named after the [[statistician]]s [[George Box]] and [[Gwilym Jenkins]], applies [[autoregressive moving average]] (ARMA) or [[autoregressive integrated moving average]] (ARIMA) models to find the best fit of a time-series model to past values of a [[time series]].

#''[[Model identification]] and [[model selection]]'': making sure that the variables are [[stationary process|stationary]], identifying [[seasonality]] in the dependent series (seasonally differencing it if necessary), and using plots of the [[autocorrelation|autocorrelation (ACF)]] and [[partial autocorrelation|partial autocorrelation (PACF)]] functions of the dependent time series to decide which (if any) autoregressive or moving average component should be used in the model.

#''[[Statistical model validation|ModelStatistical model checking]]'' by testing whether the estimated model conforms to the specifications of a stationary univariate process. In particular, the residuals should be independent of each other and constant in mean and variance over time. (Plotting the mean and variance of residuals over time and performing a [[Ljung–Box test]] or plotting autocorrelation and partial autocorrelation of the residuals are helpful to identify misspecification.) If the estimation is inadequate, we have to return to step one and attempt to build a better model.

Commandeur & Koopman (2007, §10.4)<ref>{{cite book |lastlast1=Commandeur |firstfirst1=J. J. F. |last2=Koopman |first2=S. J. |year=2007 |title=Introduction to State Space Time Series Analysis |___location= |publisher=[[Oxford University Press]] |isbn= }}</ref> argue that the Box–Jenkins approach is fundamentally problematic. The problem arises because in "the economic and social fields, real series are never stationary however much differencing is done". Thus the investigator has to face the question: how close to stationary is close enough? As the authors note, "This is a hard question to answer". The authors further argue that rather than using Box–Jenkins, it is better to use state space methods, as stationarity of the time series is then not required.

The first step in developing a Box–Jenkins model is to determine ifwhether the [[time series]] is [[Stationary process|stationary]] and ifwhether there is any significant [[seasonality]] that needs to be modelled.

Stationarity can be assessed from a [[run sequence plot]]. The run sequence plot should show constant ___location and [[Scale (ratio)|scale]]. It can also be detected from an [[autocorrelation plot]]. Specifically, non-stationarity is often indicated by an autocorrelation plot with very slow decay. One can also utilize a [[Dickey-Fuller test]] or [[Augmented Dickey-Fuller test]].

====Differencing to achieve stationarity====

Once stationarity and seasonality have been addressed, the next step is to identify the order (i.e. the ''p'' and ''q'') of the autoregressive and moving average terms. Different authors have different approaches for identifying ''p'' and ''q''. Brockwell and Davis (1991)<ref>{{cite book |lastlast1=Brockwell |firstfirst1=Peter J. |last2=Davis |first2=Richard A. |year=1991 |title=Time Series: Theory and Methods |publisher=Springer-Verlag |page=273|bibcode=1991tstm.book.....B }}</ref> state "our prime criterion for model selection [among ARMA(p,q) models] will be the AICc", i.e. the [[Akaike information criterion]] with correction. Other authors use the autocorrelation plot and the partial autocorrelation plot, described below.

! One or more spikes, rest are essentially zero (or close to zero)

! No decay to zero (or it decays extremely slowly)

Hyndman & Athanasopoulos suggest the following:<ref>{{cite webbook|last1=Hyndman|first1=Rob J|last2=Athanasopoulos|first2=George|title=Forecasting: principles and practice|url=https://www.otexts.org/fpp/8/5|accessdateaccess-date=18 May 2015}}</ref>

Estimating the parameters for Box–Jenkins models involves numerically approximating the solutions of nonlinear equations. For this reason, it is common to use statistical software designed to handle to the approach – fortunately, virtually all modern statistical packages feature this capability. The main approaches to fitting Box–Jenkins models are nonlinear least squares and maximum likelihood estimation. Maximum likelihood estimation is generally the preferred technique. The likelihood equations for the full Box–Jenkins model are complicated and are not included here. See (Brockwell and Davis, 1991) for the mathematical details.

* [https://web.archive.org/web/20070318000551/http://statistik.mathematik.uni-wuerzburg.de/timeseries/ A First Course on Time Series Analysis] – an open source book on time series analysis with SAS (Chapter 7)