Cavaliere, Giuseppe and Ørregaard Nielsen, Morten and Taylor, AM Robert (2022) Adaptive Inference in Heteroskedastic Fractional Time Series Models. Journal of Business and Economic Statistics, 40 (1). pp. 50-65. DOI https://doi.org/10.1080/07350015.2020.1773275
Cavaliere, Giuseppe and Ørregaard Nielsen, Morten and Taylor, AM Robert (2022) Adaptive Inference in Heteroskedastic Fractional Time Series Models. Journal of Business and Economic Statistics, 40 (1). pp. 50-65. DOI https://doi.org/10.1080/07350015.2020.1773275
Cavaliere, Giuseppe and Ørregaard Nielsen, Morten and Taylor, AM Robert (2022) Adaptive Inference in Heteroskedastic Fractional Time Series Models. Journal of Business and Economic Statistics, 40 (1). pp. 50-65. DOI https://doi.org/10.1080/07350015.2020.1773275
Abstract
We consider estimation and inference in fractionally integrated time series models driven by shocks which can display conditional and unconditional heteroskedasticity of unknown form. Although the standard conditional sum-of-squares (CSS) estimator remains consistent and asymptotically normal in such cases, unconditional heteroskedasticity in ates its variance matrix by a scalar quantity, λ > 1, thereby inducing a loss in efficiency relative to the unconditionally homoskedastic case, λ = 1. We propose an adaptive version of the CSS estimator, based on non-parametric kernel-based estimation of the unconditional volatility process. We show that adaptive estimation eliminates the factor λ from the variance matrix, thereby delivering the same asymptotic efficiency as that attained by the standard CSS estimator in the unconditionally homoskedastic case and, hence, asymptotic efficiency under Gaussianity. Importantly, the asymptotic analysis is based on a novel proof strategy, which does not require consistent estimation (in the sup norm) of the volatility process. Consequently, we are able to work under a weaker set of assumptions than those employed in the extant literature. The asymptotic variance matrices of both the standard and adaptive CSS estimators depend on any weak parametric autocorrelation present in the fractional model and any conditional heteroskedasticity in the shocks. Consequently, asymptotically pivotal inference can be achieved through the development of confidence regions or hypothesis tests using either heteroskedasticity-robust standard errors and/or a wild bootstrap. Monte Carlo simulations and empirical applications illustrate the practical usefulness of the methods proposed.
Item Type: | Article |
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Uncontrolled Keywords: | adaptive estimation; conditional sum-of-squares; fractional integration; heteroskedasticity; quasi-maximum likelihood estimation; wild bootstrap |
Divisions: | Faculty of Social Sciences Faculty of Social Sciences > Essex Business School |
SWORD Depositor: | Unnamed user with email elements@essex.ac.uk |
Depositing User: | Unnamed user with email elements@essex.ac.uk |
Date Deposited: | 14 May 2020 14:52 |
Last Modified: | 16 May 2024 20:22 |
URI: | http://repository.essex.ac.uk/id/eprint/27549 |
Available files
Filename: Adaptive-2020-final INCLUDING SUPPLEMENTARY APPENDIX.PDF