Slowly varying regressors are asymptotically collinear in linear regression. Usual regression formulae for asymptotic standard errors remain valid but rates of convergence are affected and the limit distribution of the regression coefficients is shown to be one dimensional. Some asymptotic representations of partial sums of slowly varying functions and central limit theorems with slowly varying weights are given that assist in the development of a regression theory. Multivariate regression and polynomial regression with slowly varying functions are considered and shown to be equivalent, up to standardization, to regression on a polynomial in a logarithmic trend. The theory involves second, third and higher order forms of slow variation. Some ...
This paper studies nonlinear cointegration models in which the structural coefficients may evolve sm...
Many empirical studies estimate the structural effect of some variable on an outcome of interest whi...
This paper considers estimation and hypothesis testing in linear time series models when some or all...
Slowly varying regressors are asymptotically collinear in linear regression. Usual regression formul...
We investigate the asymptotic behavior of the OLS estimator for regressions with two slowly varying ...
This paper considers the regression model with a slowly varying (SV) regressor in the presence of a ...
Standardized slowly varying regressors are shown to be $L_p$-approximable. This fact allows one to r...
We propose a general method of modeling deterministic trends for autoregressions. The method relies ...
Limit theory is developed for least squares regression estimation of a model involving time trend po...
Standardized slowly varying regressors are shown to be Lp-appro-ximable. This fact allows one to rel...
The most part of the paper is about modeling (or approximating) nonstochastic regressors. Examples o...
A time-varying autoregression is considered with a similarity-based coefficient and possible drift. I...
Power law or generalized polynomial regressions with unknown real-valued exponents and coefficients,...
We show that OLS and GLS are asymptotically equivalent in the linear regression model with AR(p)-9is...
We consider a mixed vector autoregressive model with deterministic exogenous regressors and an autor...
This paper studies nonlinear cointegration models in which the structural coefficients may evolve sm...
Many empirical studies estimate the structural effect of some variable on an outcome of interest whi...
This paper considers estimation and hypothesis testing in linear time series models when some or all...
Slowly varying regressors are asymptotically collinear in linear regression. Usual regression formul...
We investigate the asymptotic behavior of the OLS estimator for regressions with two slowly varying ...
This paper considers the regression model with a slowly varying (SV) regressor in the presence of a ...
Standardized slowly varying regressors are shown to be $L_p$-approximable. This fact allows one to r...
We propose a general method of modeling deterministic trends for autoregressions. The method relies ...
Limit theory is developed for least squares regression estimation of a model involving time trend po...
Standardized slowly varying regressors are shown to be Lp-appro-ximable. This fact allows one to rel...
The most part of the paper is about modeling (or approximating) nonstochastic regressors. Examples o...
A time-varying autoregression is considered with a similarity-based coefficient and possible drift. I...
Power law or generalized polynomial regressions with unknown real-valued exponents and coefficients,...
We show that OLS and GLS are asymptotically equivalent in the linear regression model with AR(p)-9is...
We consider a mixed vector autoregressive model with deterministic exogenous regressors and an autor...
This paper studies nonlinear cointegration models in which the structural coefficients may evolve sm...
Many empirical studies estimate the structural effect of some variable on an outcome of interest whi...
This paper considers estimation and hypothesis testing in linear time series models when some or all...
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