We establish the asymptotic theory in quantile autoregression when the model parameter is specified with respect to moderate deviations from the unit boundary of the form (1 + c / k) with a convergence sequence that diverges at a rate slower than the sample size n. Then, extending the framework proposed by Phillips and Magdalinos (2007), we consider the limit theory for the near-stationary and the near-explosive cases when the model is estimated with a conditional quantile specification function and model parameters are quantile-dependent. Additionally, a Bahadur-type representation and limiting distributions based on the M-estimators of the model parameters are derived. Specifically, we show that the serial correlation coefficient converge...
An asymptotic theory is given for autoregressive time series with weakly dependent innovations and a...
The authors derive the limiting distribution of M-estimators in AR(p) models under nonstandard condi...
A limit theory is established for autoregressive time series that smooths the transition between loc...
An asymptotic theory is given for autoregressive time series with a root of the form , which represe...
Abstract. We study statistical inference in quantile autoregression models when the largest au-toreg...
Onassis Foundation for scholarship support. An asymptotic theory is given for autoregressive time se...
AbstractConsider a near-integrated time series driven by a heavy-tailed and long-memory noise εt=∑j=...
This paper investigates regression quantiles(RQ) for unstable autoregressive models. This uniform Ba...
<p>A quantile autoregresive model is a useful extension of classical autoregresive models as it can ...
AbstractThis paper investigates regression quantiles (RQ) for unstable autoregressive models. The un...
This paper investigates regression quantiles (RQ) for unstable autoregres-sive models. The uniform B...
This paper extends the concept of regression and autoregression quantiles and rank scores to a very ...
In this paper, we propose two important measures, quantile correlation (QCOR) and quantile partial c...
<div><p>In this article, we propose two important measures, quantile correlation (QCOR) and quantile...
An asymptotic theory is given for autoregressive time series with a root of the form ρ n = 1 + c/ n ...
An asymptotic theory is given for autoregressive time series with weakly dependent innovations and a...
The authors derive the limiting distribution of M-estimators in AR(p) models under nonstandard condi...
A limit theory is established for autoregressive time series that smooths the transition between loc...
An asymptotic theory is given for autoregressive time series with a root of the form , which represe...
Abstract. We study statistical inference in quantile autoregression models when the largest au-toreg...
Onassis Foundation for scholarship support. An asymptotic theory is given for autoregressive time se...
AbstractConsider a near-integrated time series driven by a heavy-tailed and long-memory noise εt=∑j=...
This paper investigates regression quantiles(RQ) for unstable autoregressive models. This uniform Ba...
<p>A quantile autoregresive model is a useful extension of classical autoregresive models as it can ...
AbstractThis paper investigates regression quantiles (RQ) for unstable autoregressive models. The un...
This paper investigates regression quantiles (RQ) for unstable autoregres-sive models. The uniform B...
This paper extends the concept of regression and autoregression quantiles and rank scores to a very ...
In this paper, we propose two important measures, quantile correlation (QCOR) and quantile partial c...
<div><p>In this article, we propose two important measures, quantile correlation (QCOR) and quantile...
An asymptotic theory is given for autoregressive time series with a root of the form ρ n = 1 + c/ n ...
An asymptotic theory is given for autoregressive time series with weakly dependent innovations and a...
The authors derive the limiting distribution of M-estimators in AR(p) models under nonstandard condi...
A limit theory is established for autoregressive time series that smooths the transition between loc...