Cointegration in Fractional Systems with Unknown Integration Orders

Robinson, Peter; Hualde, Javier

doi:10.1111/1468-0262.00468

Cited by 123 publications

(132 citation statements)

References 31 publications

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“…In this context, the application of the emerging fractional cointegration techniques (see Robinson and Hualde (2003) and Johansen (2007) among others) may prove a fruitful avenue of research.…”

Section: Discussionmentioning

confidence: 99%

Uncovering the US term premium: An alternative route

Gil-Alana

Moreno

2012

Journal of Banking & Finance

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The estimates of the U.S. term premium crucially depend upon the ex-ante decision on whether the short-term rate is either an I(0) or an I(1) process. In this paper we estimate a fractionally integrated (I(d)) model which simultaneously determines both the order of integration of the short-term rate and the associated term premium. We show that the term premium was essentially zero at the end of 2006, after having experienced a steady decline of around 2. JEL Classification: E4, G1, C5

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Section: Discussionmentioning

confidence: 99%

Uncovering the US term premium: An alternative route

Gil-Alana

Moreno

2012

Journal of Banking & Finance

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“…Multivariate I(d) models have been mainly developed in the context of fractional cointegration (see, e.g., Robinson and Hualde (2003)), requiring, in our bi-variate context, that the two variables display the same degree of integration.…”

Section: Fractional Integrationmentioning

confidence: 99%

Term Structure Persistence

Abbritti¹,

Gil-Alana²,

Lovcha³

et al. 2015

JOURNAL OF FINANCIAL ECONOMETRICS

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Stationary I(0) models employed in yield curve analysis typically imply an unrealistically low degree of volatility in long-run short-rate expectations due to fast mean reversion. In this paper we propose a novel multivariate affine term structure model with a two-fold source of persistence in the yield curve: Long-memory and short-memory. Our model, based on an I(d) specification, nests the I(0) and I(1) models as special cases and the I(0) model is decisively rejected by the data. Our model estimates imply both mean reversion in yields and quite volatile long-distance short-rate expectations, due to the higher persistence imparted by the long-memory component. Our implied term premium estimates differ from those of the I(0) model during some relevant periods by more than 4 percentage points and exhibit a realistic countercyclical pattern. Mirko Abbritti AbstractStationary I(0) models employed in yield curve analysis typically imply an unrealistically low degree of volatility in long-run short-rate expectations due to fast mean reversion. In this paper we propose a novel multivariate affine term structure model with a two-fold source of persistence in the yield curve: Long-memory and short-memory. Our model, based on an I(d) specification, nests the I(0) and I(1) models as special cases and the I(0) model is decisively rejected by the data. Our model estimates imply both mean reversion in yields and quite volatile long-distance short-rate expectations, due to the higher persistence imparted by the long-memory component. Our implied term premium estimates differ from those of the I(0) model during some relevant periods by more than 4 percentage points and exhibit a realistic countercyclical pattern.JEL Classification: C3, E4, G1

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“…3 See, e.g., Velasco (1999), Robinson (2003), Abadir et al (2005), Shimotsu and Phillips (2005) and range of semiparametric estimators for the input value of d with an auxiliary parametric regression, as the one discussed above, yields a parametric rate for the Wald tests. Thus, in a sense, the Wald tests combine the favorable features of both approaches to improve power, while reducing the danger of misspecifying short-run dynamics.…”

Section: Introductionmentioning

confidence: 99%

Wald Tests of I(1) against I(d) Alternatives: Some New Properties and an Extension to Processes with Trending Components

Dolado¹,

Gonzalo²,

Mayoral³

2008

Studies in Nonlinear Dynamics &Amp; Econometrics

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This paper analyses the behaviour of a Wald-type test, i.e., the (E¢ cient) Fractional Dickey-Fuller (EFDF) test of I(1) against I(d); d < 1; relative to LM tests. Further, it extends the implementation of the EFDF test to the presence of deterministic trending components in the DGP. Tests of these hypotheses are important in many macroeconomic applications where it is crucial to distinguish between permanent and transitory shocks because shocks die out in I(d) processes with d < 1. We show how simple is the implementation of the EFDF in these situations and argue that, under …xed alternatives, it is preferred to the LM test in Bahadur´s sense. Finally, an empirical application is provided where the EFDF approach allowing for deterministic components is used to test for long-memory in the GDP p.c. of several OECD countries, an issue that has important consequences to discriminate between alternative growth theories.JEL Clasi…cation: C12 C22 O40

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Cointegration in Fractional Systems with Unknown Integration Orders

Cited by 123 publications

References 31 publications

Uncovering the US term premium: An alternative route

Uncovering the US term premium: An alternative route

Term Structure Persistence

Wald Tests of I(1) against I(d) Alternatives: Some New Properties and an Extension to Processes with Trending Components

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