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Line 1: {{Short description\|Time series statistical test}} ~~In [[statistics]], a '''unit root test''' tests whether a [[time series]] variable is non-stationary using an [[autoregressive]] model.~~ In [[statistics]], a '''unit root test''' tests whether a [[time series]] variable is non-stationary and possesses a [[unit root]]. The null hypothesis is generally defined as the presence of a unit root and the alternative hypothesis is either [[Stationary process\|stationarity]], [[Trend-stationary process\|trend stationarity]] or explosive root depending on the test used. == General approach == Line 5 ⟶ 6: </math> can be written as, :<math>y_t = D_t + z_t + \varepsilon_t </math> where, Line 18 ⟶ 19: == Main tests == A commonly used test that is valid in large samples is the [[augmented Dickey–Fuller test]]. The optimal finite sample tests for a unit root in autoregressive models were developed by [[Denis Sargan]] and [[Alok Bhargava]] by extending the work by [[John von Neumann]], and [[James Durbin]] and [[Geoffrey Watson]]. In the observed time series cases, for example, Sargan-Bhargava statistics test the unit root null hypothesis in first order autoregressive models against one-sided alternatives, i.e., if the process is stationary or explosive under the alternative hypothesis. Other popular tests include: * [[augmented Dickey–Fuller test]]<ref>{{Cite journal \| doi = 10.1080/01621459.1979.10482531\| title = Distribution of the estimators for autoregressive time series with a unit root\| year = 1979\| last1 = Dickey \| first1 = D. A. \| last2 = Fuller \| first2 = W. A. \| journal = [[Journal of the American Statistical Association]] \| volume = 74\| issue = 366a\| pages = 427–431}}</ref>▼ : this is valid in large samples. [[Phillips–Perron test]] * [[KPSS test]] : ~~(in which~~here the null hypothesis is [[Trend -stationary process\|trend stationarity]] rather than the presence of a [[Stationary process\|~~stationarity~~unit root]]). [[ADF-GLS test]] * [[Zivot–Andrews test]] Unit root tests are closely linked to [[Autocorrelation\|serial correlation]] tests. However, while all processes with a unit root will exhibit serial correlation, not all serially correlated time series will have a unit root. Popular serial correlation tests include: * [[Breusch–Godfrey test]] Line 31 ⟶ 33: ==Notes== {{Notelist}} {{Reflist}} ==References== {{cite book \|last=Bierens, \|first=H. J. (\|year=2001). "\|chapter=Unit roots~~", Ch. 29 in~~ ''\|title=A Companion to Econometric Theory~~'',~~ \|editor -first=B. \|editor-last=Baltagi, \|___location=Oxford: \|publisher=[[Blackwell Publishers]], \|pages=610–633. }} [http://econ.la.psu.edu/~hbierens/UNITROOT.PDF "2007 revision"] {{Webarchive\|url=https://web.archive.org/web/20140617113943/http://econ.la.psu.edu/~hbierens/UNITROOT.PDF \|date=2014-06-17 }}▼ {{Cite journal \| last1 = Bhargava \| first1 = A. \| authorlink = Alok Bhargava\| title = On the theory of testing for unit roots in observed time series \| journal = [[The Review of Economic Studies]] \| volume = 53 \| issue = 3 \| pages = 369–384 \| doi = 10.2307/2297634 \| jstor = 2297634\| year = 1986 \| pmid = \| pmc = }} {{cite book \|last=Enders \|first=Walter \|title=Applied Econometric Time Series \|publisher=[[John Wiley & Sons]] \|year=2004 \|edition=Second \|pages=[https://archive.org/details/appliedeconometr00ende_0/page/170 170–175] \|isbn=0-471-23065-0 \|url-access=registration \|url=https://archive.org/details/appliedeconometr00ende_0/page/170 }}▼ ▲ Bierens, H.J. (2001). "Unit roots", Ch. 29 in ''A Companion to Econometric Theory'', editor B. Baltagi, Oxford: [[Blackwell Publishers]], 610–633. [http://econ.la.psu.edu/~hbierens/UNITROOT.PDF "2007 revision"] {{cite book \|last=Maddala \|first=G. S. \|authorlink=G. S. Maddala \|last2=Kim \|first2=In-Moo \|chapter=Issues in Unit Root Testing \|title=Unit Roots, Cointegration, and Structural Change \|url=https://archive.org/details/unitrootscointeg00madd \|url-access=limited \|___location=Cambridge \|publisher=Cambridge University Press \|year=1998 \|isbn=0-521-58782-4 \|pages=[https://archive.org/details/unitrootscointeg00madd/page/n116 98]–154 }} ▲ {{Cite journal \| doi = 10.1080/01621459.1979.10482531\| title = Distribution of the estimators for autoregressive time series with a unit root\| year = 1979\| last1 = Dickey \| first1 = D. A. \| last2 = Fuller \| first2 = W. A. \| journal = [[Journal of the American Statistical Association]] \| volume = 74\| issue = 366a\| pages = 427–431}} ▲{{cite book \|last=Enders \|first=Walter \|title=Applied Econometric Time Series \|publisher=[[John Wiley & Sons]] \|year=2004 \|edition=Second \|pages=170–175 \|isbn=0-471-23065-0 }} {{citation \| first= K. \| last= Patterson \| title= Unit Root Tests in Time Series \| volume= 1 \| year= 2011 \| publisher= [[Palgrave Macmillan]]}}. {{citation \| first= K. \| last= Patterson \| title= Unit Root Tests in Time Series \| volume= 2 \| year= 2012 \| publisher= [[Palgrave Macmillan]]}}. {{Cite journal \| last1 = Sargan \| first1 = J. D. \| last2 = Bhargava \| first2 = Alok \| year = 1983 \| title = Testing residuals from least squares regression for being generated by the Gaussian random walk \| journal = [[Econometrica]] \| volume = 51 \| issue = 1 \| pages = 153–174 \| publisher = \| jstor = 1912252 \| doix = <!-- {{subst:#titleparts:{{subst:PAGENAME}}\|0\|2}} --> \| url = \| format = \| accessdate = }} [[Category:~~Statistical~~Time series statistical tests]] ~~[[Category:Time series analysis]]~~