Power law or generalized polynomial regressions with unknown real-valued exponents and coefficients, and weakly dependent errors, are considered for observations over time, space or space-time. Consistency and asymptotic normality of nonlinear least-squares estimates of the parameters are established. The joint limit distribution is singular, but can be used as a basis for inference on either exponents or coefficients.We discuss issues of implementation, efficiency, potential for improved estimation and possibilities of extension to more general or alternative trending models to allow for irregularly spaced data or heteroscedastic errors; though it focusses on a particular model to fix ideas, the paper can be viewed as offering machinery us...
We consider the consistency and weak convergence of $S$-estimators in the linear regression model. S...
It is well known that random multiplicative processes generate power-law probability distributions. ...
<p>The article considers statistical inference for trends of high-dimensional time series. Based on ...
Power law or generalized polynomial regressions with unknown real-valued exponents and coefficients,...
Results on asymptotic and finite sample properties of an estimator of a nonlinear regression functio...
We consider a model with both a parametric global trend and a nonparametric local trend. This model ...
[[abstract]]For a time series generated by polynomial trend with stationary long-memory errors, the ...
Power-law distributions occur in many situations of scientific interest and have significant consequ...
Limit theory is developed for least squares regression estimation of a model involving time trend po...
Models based on a power law are prevalent in many areas of study. When regression analysis is perfor...
The prediction of spatially and/or temporal varying variates based on observations of these variates...
A general limit theorem is established for time series regression estimates which include generalize...
A central limit theorem is established for time series regression estimates which include generalize...
In this paper, we establish the asymptotic normality through a Berry Esseen type bound, of a local l...
This dissertation consists of five chapters. In Chapter 1, we collect some fundamental concepts and ...
We consider the consistency and weak convergence of $S$-estimators in the linear regression model. S...
It is well known that random multiplicative processes generate power-law probability distributions. ...
<p>The article considers statistical inference for trends of high-dimensional time series. Based on ...
Power law or generalized polynomial regressions with unknown real-valued exponents and coefficients,...
Results on asymptotic and finite sample properties of an estimator of a nonlinear regression functio...
We consider a model with both a parametric global trend and a nonparametric local trend. This model ...
[[abstract]]For a time series generated by polynomial trend with stationary long-memory errors, the ...
Power-law distributions occur in many situations of scientific interest and have significant consequ...
Limit theory is developed for least squares regression estimation of a model involving time trend po...
Models based on a power law are prevalent in many areas of study. When regression analysis is perfor...
The prediction of spatially and/or temporal varying variates based on observations of these variates...
A general limit theorem is established for time series regression estimates which include generalize...
A central limit theorem is established for time series regression estimates which include generalize...
In this paper, we establish the asymptotic normality through a Berry Esseen type bound, of a local l...
This dissertation consists of five chapters. In Chapter 1, we collect some fundamental concepts and ...
We consider the consistency and weak convergence of $S$-estimators in the linear regression model. S...
It is well known that random multiplicative processes generate power-law probability distributions. ...
<p>The article considers statistical inference for trends of high-dimensional time series. Based on ...