A Note on the Size of the ADF Test with Additive Outliers and Fractional Errors. A Reappraisal about the (Non)Stationarity of the Latin-American Inflation Series / Una nota sobre el tamaño del Test ADF con outliers aditivos y errores fraccionales. Una re-evaluación de la (no) estacionariedad de las series de inflación latinoamericanas

Rodríguez, Gabriel, Ramírez, Dionisio

10 April 2018

This note analyzes the empirical size of the augmented Dickey and Fuller (ADF) statistic proposedby Perron and Rodríguez (2003) when the errors are fractional. This ADF is based on a searching procedure for additive outliers based on first-differences of the data named td. Simulations show that empirical size of the ADF is not affected by fractional errors confirming the claim of Perron and Rodríguez (2003) that the procedure td is robust to departures of the unit root framework. In particular the results show low sensitivity of the size of the ADF statistic respect to the fractional parameter (d). However, as expected, when there is strong negative moving average autocorrelation or negative autoregressive autocorrelation, the ADF statistic is oversized. These difficulties are fixed when sample increases (from T = 100 to T = 200). Empirical application to eight quarterly Latin American inflation series is also provided showing the importance of taking into account dummy variables for the detected additive outliers. / En esta nota se analiza el tamaño empírico del estadístico Dickey y Fuller aumentado (ADF), propuesto por Perron y Rodríguez (2003), cuando los errores son fraccionales. Este estadístico se basa en un procedimiento de búsqueda de valores atípicos aditivos basado en las primeras diferencias de los datos denominado td. Las simulaciones muestran que el tamaño empírico del estadístico ADF no es afectado por los errores fraccionales confirmando el argumento de Perron y Rodríguez (2003) que el procedimiento td es robusto a las desviaciones del marco de raíz unitaria. En particular, los resultados muestran una baja sensibilidad del tamaño del estadístico ADF respecto al parámetro fraccional (d). Sin embargo, como es de esperar, cuando hay una fuerte autocorrelación negativa de tipo promedio móvil o autocorrelación autorregresiva negativa, el estadístico ADF tiene un tamaño exacto mayor que el nominal. Estas dificultades desaparecen cuando aumenta la muestra (a partir de T = 100 a T = 200). La aplicación empírica a ocho series de inflación latinoamericana trimestral proporciona evidencia de la importancia de tener en cuenta las variables ficticias para controlar por los outliers aditivos detectados.

Economy

Additive Outliers

Arfima Erros

Adf Test

Outliers Aditivos

Errores Arfima

Test Adf

Unit root, outliers and cointegration analysis with macroeconomic applications

Rodríguez, Gabriel

10 1900

Thèse numérisée par la Direction des bibliothèques de l'Université de Montréal. / In this thesis, we deal with three particular issues in the literature on nonstationary time series. The first essay deals with various unit root tests in the context of structural change. The second paper studies some residual based tests in order to identify cointegration. Finally, in the third essay, we analyze several tests in order to identify additive outliers in nonstationary time series. The first paper analyzes the hypothesis that some time series can be characterized as stationary with a broken trend. We extend the class of M-tests and ADF test for a unit root to the case where a change in the trend function is allowed to occur at an unknown time. These tests (MGLS, ADFGLS) adopt the Generalized Least Squares (GLS) detrending approach to eliminate the set of deterministic components present in the model. We consider two models in the context of the structural change literature. The first model allows for a change in slope and the other for a change in slope as well as intercept. We derive the asymptotic distribution of the tests as well as that of the feasible point optimal test (PF-Ls) which allows us to find the power envelope. The asymptotic critical values of the tests are tabulated and we compute the non-centrality parameter used for the local GLS detrending that permits the tests to have 50% asymptotic power at that value. Two methods to select the break point are analyzed. A first method estimates the break point that yields the minimal value of the statistic. In the second method, the break point is selected such that the absolute value of the t-statistic on the change in slope is maximized. We show that the MGLS and PTGLS tests have an asymptotic power function close to the power envelope. An extensive simulation study analyzes the size and power of the tests in finite samples under various methods to select the truncation lag for the autoregressive spectral density estimator. In an empirical application, we consider two U.S. macroeconomic annual series widely used in the unit root literature: real wages and common stock prices. Our results suggest a rejection of the unit root hypothesis. In other words, we find that these series can be considered as trend stationary with a broken trend. Given the fact that using the GLS detrending approach allows us to attain gains in the power of the unit root tests, a natural extension is to propose this approach to the context of tests based on residuals to identify cointegration. This is the objective of the second paper in the thesis. In fact, we propose residual based tests for cointegration using local GLS detrending to eliminate separately the deterministic components in the series. We consider two cases, one where only a constant is included and one where a constant and a time trend are included. The limiting distributions of various residuals based tests are derived for a general quasi-differencing parameter and critical values are tabulated for values of c = 0 irrespective of the nature of the deterministic components and also for other values as proposed in the unit root literature. Simulations show that GLS detrending yields tests with higher power. Furthermore, using c = -7.0 or c = -13.5 as the quasi-differencing parameter, based on the two cases analyzed, is preferable. The third paper is an extension of a recently proposed method to detect outliers which explicitly imposes the null hypothesis of a unit root. it works in an iterative fashion to select multiple outliers in a given series. We show, via simulation, that under the null hypothesis of no outliers, it has the right size in finite samples to detect a single outlier but when applied in an iterative fashion to select multiple outliers, it exhibits severe size distortions towards finding an excessive number of outliers. We show that this iterative method is incorrect and derive the appropriate limiting distribution of the test at each step of the search. Whether corrected or not, we also show that the outliers need to be very large for the method to have any decent power. We propose an alternative method based on first-differenced data that has considerably more power. The issues are illustrated using two US/Finland real exchange rate series.

Nonstationary time series

Unit root tests

Structural change

Cointegration

Additive outliers

Generalized Least Squares (GLS)

Trend stationarity

Residual-based tests

Break point selection

Asymptotic power