﻿Template-type: ReDIF-Article 1.0
Author-Name: Beare, Brendan K.
Title: ARCHIMEDEAN COPULAS AND TEMPORAL DEPENDENCE
Journal: Econometric Theory
Pages: 1165-1185
Issue: 6
Volume: 28
Year: 2012
Month: December
Abstract: We study the dependence properties of stationary Markov chains generated by Archimedean copulas. Under some simple regularity conditions, we show that regular variation of the Archimedean generator at zero and one implies geometric ergodicity of the associated Markov chain. We verify our assumptions for a range of Archimedean copulas used in applications.
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Handle: RePEc:cup:etheor:v:28:y:2012:i:06:p:1165-1185_00


Template-type: ReDIF-Article 1.0
Author-Name: Guay, Alain
Author-Name: Lamarche, Jean-François
Title: STRUCTURAL CHANGE TESTS BASED ON IMPLIED PROBABILITIES FOR GEL CRITERIA
Journal: Econometric Theory
Pages: 1186-1228
Issue: 6
Volume: 28
Year: 2012
Month: December
Abstract: This paper proposes Pearson-type statistics based on implied probabilities to detect structural change. The class of generalized empirical likelihood estimators (see Smith 1997, The Economic Journal107, 503–519) assigns a set of implied probabilities to each observation such that moment conditions are satisfied. The proposed test statistics for structural change are based on the information content in these implied probabilities. We consider cases of structural change with unknown breakpoint that can occur in the parameters of interest or in the overidentifying restrictions used to estimate these parameters. We also propose a structural change test based on implied probabilities that is robust to weak identification or cases in which parameters are completely unidentified. The test statistics considered here have competitive size and power properties. Moreover, they are computed in a single step, which eliminates the need to compute the weighting matrix required for generalized method of moments estimation.
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Handle: RePEc:cup:etheor:v:28:y:2012:i:06:p:1186-1228_00


Template-type: ReDIF-Article 1.0
Author-Name: Jun, Sung Jae
Author-Name: Pinkse, Joris
Title: TESTING UNDER WEAK IDENTIFICATION WITH CONDITIONAL MOMENT RESTRICTIONS
Journal: Econometric Theory
Pages: 1229-1282
Issue: 6
Volume: 28
Year: 2012
Month: December
Abstract: We propose a semiparametric test for the value of coefficients in models with conditional moment restrictions that has correct size regardless of identification strength. The test is in essence an Anderson-Rubin (AR) test using nonparametrically estimated instruments to which we apply a standard error correction. We show that the test is (1) always size-correct, (2) consistent when identification is not too weak, and (3) asymptotically equivalent to an infeasible AR test when identification is sufficiently strong. We moreover prove that under homoskedasticity and strong identification our test has a limiting noncentral chi-square distribution under a sequence of local alternatives, where the noncentrality parameter is given by a quadratic form of the inverse of the semiparametric efficiency bound.
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Handle: RePEc:cup:etheor:v:28:y:2012:i:06:p:1229-1282_00


Template-type: ReDIF-Article 1.0
Author-Name: Koul, Hira L.
Author-Name: Perera, Indeewara
Author-Name: Silvapulle, Mervyn J.
Title: LACK-OF-FIT TESTING OF THE CONDITIONAL MEAN FUNCTION IN A CLASS OF MARKOV MULTIPLICATIVE ERROR MODELS
Journal: Econometric Theory
Pages: 1283-1312
Issue: 6
Volume: 28
Year: 2012
Month: December
Abstract: The family of multiplicative error models, introduced by Engle (2002, Journal of Applied Econometrics 17, 425–446), has attracted considerable attention in recent literature for modeling positive random variables, such as the duration between trades at a stock exchange, volume transactions, and squared log returns. Such models are also applicable to other positive variables such as waiting time in a queue, daily/hourly rainfall, and demand for electricity. This paper develops a new method for testing the lack-of-fit of a given parametric multiplicative error model having a Markov structure. The test statistic is of Kolmogorov–Smirnov type based on a particular martingale transformation of a marked empirical process. The test is asymptotically distribution free, is consistent against a large class of fixed alternatives, and has nontrivial asymptotic power against a class of nonparametric local alternatives converging to the null hypothesis at the rate of O (n–1/2). In a simulation study, the test performed better overall than the general purpose Ljung–Box Q-test, a Lagrange multiplier type test, and a generalized moment test. We illustrate the testing procedure by considering two data examples.
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Template-type: ReDIF-Article 1.0
Author-Name: Bauer, Dietmar
Author-Name: Wagner, Martin
Title: A STATE SPACE CANONICAL FORM FOR UNIT ROOT PROCESSES
Journal: Econometric Theory
Pages: 1313-1349
Issue: 6
Volume: 28
Year: 2012
Month: December
Abstract: In this paper we develop a canonical state space representation of autoregressive moving average (ARMA) processes with unit roots with integer integration orders at arbitrary unit root frequencies. The developed representation utilizes a state process with a particularly simple dynamic structure, which in turn renders this representation highly suitable for unit root, cointegration, and polynomial cointegration analysis. We also propose a new definition of polynomial cointegration that overcomes limitations of existing definitions and extends the definition of multicointegration for I(2) processes of Granger and Lee (1989a, Journal of Applied Econometrics4, 145–159). A major purpose of the canonical representation for statistical analysis is the development of parameterizations of the sets of all state space systems of a given system order with specified unit root frequencies and integration orders. This is, e.g., useful for pseudo maximum likelihood estimation. In this respect an advantage of the state space representation, compared to ARMA representations, is that it easily allows one to put in place restrictions on the (co)integration properties. The results of the paper are exemplified for the cases of largest interest in applied work.
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Template-type: ReDIF-Article 1.0
Author-Name: Martellosio, Federico
Title: THE CORRELATION STRUCTURE OF SPATIAL AUTOREGRESSIONS
Journal: Econometric Theory
Pages: 1373-1391
Issue: 6
Volume: 28
Year: 2012
Month: December
Abstract: This paper investigates how the correlations implied by a first-order simultaneous autoregressive (SAR(1)) process are affected by the weights matrix and the autocorrelation parameter. A graph theoretic representation of the covariances in terms of walks connecting the spatial units helps to clarify a number of correlation properties of the processes. In particular, we study some implications of row-standardizing the weights matrix, the dependence of the correlations on graph distance, and the behavior of the correlations at the extremes of the parameter space. Throughout the analysis differences between directed and undirected networks are emphasized. The graph theoretic representation also clarifies why it is difficult to relate properties of W to correlation properties of SAR(1) models defined on irregular lattices.
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Handle: RePEc:cup:etheor:v:28:y:2012:i:06:p:1373-1391_00