Asymptotic theory for near integrated processes driven by tempered linear processes
In an early article on near-unit root autoregression, Ahtola and Tiao (1984) studied the behavior of the score function in a stationary first order autoregression driven by independent Gaussian innovations as the autoregressive coefficient approached unity from below. The present paper develops asym...
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sg-smu-ink.soe_research-33832020-05-28T06:59:50Z Asymptotic theory for near integrated processes driven by tempered linear processes SABZIKAR, Farzad WANG, Qiying PHILLIPS, Peter C. B. In an early article on near-unit root autoregression, Ahtola and Tiao (1984) studied the behavior of the score function in a stationary first order autoregression driven by independent Gaussian innovations as the autoregressive coefficient approached unity from below. The present paper develops asymptotic theory for near-integrated random processes and associated regressions including the score function in more general settings where the errors are tempered linear processes. Tempered processes are stationary time series that have a semi-long memory property in the sense that the autocovariogram of the process resembles that of a long memory model for moderate lags but eventually diminishes exponentially fast according to the presence of a decay factor governed by a tempering parameter. When the tempering parameter is sample size dependent, the resulting class of processes admits a wide range of behavior that includes both long memory, semi-long memory, and short memory processes. The paper develops asymptotic theory for such processes and associated regression statistics thereby extending earlier findings that fall within certain subclasses of processes involving near-integrated time series. The limit results relate to tempered fractional processes that include tempered fractional Brownian motion and tempered fractional diffusions of the second kind. The theory is extended to provide the limiting distribution for autoregressions with such tempered near-integrated time series, thereby enabling analysis of the limit properties of statistics of particular interest in econometrics, such as unit root tests, under more general conditions than existing theory. Some extensions of the theory to the multivariate case are reported. 2020-05-01T07:00:00Z text application/pdf https://ink.library.smu.edu.sg/soe_research/2384 info:doi/10.1016/j.jeconom.2020.01.013 https://ink.library.smu.edu.sg/context/soe_research/article/3383/viewcontent/Asymptotic_theory_tempered_linear_process_av.pdf http://creativecommons.org/licenses/by-nc-nd/4.0/ Research Collection School Of Economics eng Institutional Knowledge at Singapore Management University Asymptotics Fractional integration Integrated process Near unit root Tempered process Econometrics |
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Asymptotics Fractional integration Integrated process Near unit root Tempered process Econometrics SABZIKAR, Farzad WANG, Qiying PHILLIPS, Peter C. B. Asymptotic theory for near integrated processes driven by tempered linear processes |
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In an early article on near-unit root autoregression, Ahtola and Tiao (1984) studied the behavior of the score function in a stationary first order autoregression driven by independent Gaussian innovations as the autoregressive coefficient approached unity from below. The present paper develops asymptotic theory for near-integrated random processes and associated regressions including the score function in more general settings where the errors are tempered linear processes. Tempered processes are stationary time series that have a semi-long memory property in the sense that the autocovariogram of the process resembles that of a long memory model for moderate lags but eventually diminishes exponentially fast according to the presence of a decay factor governed by a tempering parameter. When the tempering parameter is sample size dependent, the resulting class of processes admits a wide range of behavior that includes both long memory, semi-long memory, and short memory processes. The paper develops asymptotic theory for such processes and associated regression statistics thereby extending earlier findings that fall within certain subclasses of processes involving near-integrated time series. The limit results relate to tempered fractional processes that include tempered fractional Brownian motion and tempered fractional diffusions of the second kind. The theory is extended to provide the limiting distribution for autoregressions with such tempered near-integrated time series, thereby enabling analysis of the limit properties of statistics of particular interest in econometrics, such as unit root tests, under more general conditions than existing theory. Some extensions of the theory to the multivariate case are reported. |
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SABZIKAR, Farzad WANG, Qiying PHILLIPS, Peter C. B. |
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SABZIKAR, Farzad WANG, Qiying PHILLIPS, Peter C. B. |
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SABZIKAR, Farzad |
| title |
Asymptotic theory for near integrated processes driven by tempered linear processes |
| title_short |
Asymptotic theory for near integrated processes driven by tempered linear processes |
| title_full |
Asymptotic theory for near integrated processes driven by tempered linear processes |
| title_fullStr |
Asymptotic theory for near integrated processes driven by tempered linear processes |
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Asymptotic theory for near integrated processes driven by tempered linear processes |
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asymptotic theory for near integrated processes driven by tempered linear processes |
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Institutional Knowledge at Singapore Management University |
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2020 |
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https://ink.library.smu.edu.sg/soe_research/2384 https://ink.library.smu.edu.sg/context/soe_research/article/3383/viewcontent/Asymptotic_theory_tempered_linear_process_av.pdf |
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